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Ultrasonic Non-Destructive Evaluation: ImpactPoint Prediction and Simulation of Ultrasonic Fields
Item Type text; Electronic Dissertation
Authors Hajzargarbashi, Talieh
Publisher The University of Arizona.
Rights Copyright © is held by the author. Digital access to this materialis made possible by the University Libraries, University of Arizona.Further transmission, reproduction or presentation (such aspublic display or performance) of protected items is prohibitedexcept with permission of the author.
Download date 26/05/2018 21:33:57
Link to Item http://hdl.handle.net/10150/203430
ULTRASONIC NON-DESTRUCTIVE EVALUATION: IMPACT POINT
PREDICTION AND SIMULATION OF ULTRASONIC FIELDS
by
Talieh Hajzargarbashi
_____________________
A Dissertation Submitted to the Faculty of the
DEPARTMENT OF CIVIL ENGINEERING AND ENGINEERING
MECHANICS
In Partial Fulfillment of the Requirements
For the Degree of
DOCTOR OF PHILOSOPHY
WITH A MAJOR IN ENGINEERING MECHANICS
In the Graduate College
THE UNIVERSITY OF ARIZONA
2011
2
2
THE UNIVERSITY OF ARIZONA
GRADUATE COLLEGE
As members of the Dissertation Committee, we certify that we have read the dissertation
prepared by Talieh Hajzargarbashi
entitled ULTRASONIC NON-DESTRUCTIVE EVALUATION: IMPACT POINT
PREDICTION AND SIMULATION OF ULTRASONIC FIELDS
and recommend that it be accepted as fulfilling the dissertation requirement for the
Degree of Doctor of Philosophy
_______________________________________________________________________ Date: 11/21/11
Dr. Tribikram Kundu
_______________________________________________________________________ Date: 11/21/11
Dr. George Frantziskonis
_______________________________________________________________________ Date: 11/21/11
Dr. Lianyang Zhang
_______________________________________________________________________ Date:
_______________________________________________________________________ Date:
Final approval and acceptance of this dissertation is contingent upon the candidate’s
submission of the final copies of the dissertation to the Graduate College.
I hereby certify that I have read this dissertation prepared under my direction and
recommend that it be accepted as fulfilling the dissertation requirement.
________________________________________________ Date:
Dissertation Director:
3
STATEMENT BY AUTHOR
This dissertation has been submitted in partial fulfillment of requirements for an
advanced degree at the University of Arizona and is deposited in the University Library
to be made available to borrowers under rules of the Library.
Brief quotations from this dissertation are allowable without special permission, provided
that accurate acknowledgment of source is made. Requests for permission for extended
quotation from or reproduction of this manuscript in whole or in part may be granted by
the author.
SIGNED: Talieh Hajzargarbashi
4
ACKNOWLEDGEMENTS
I would like to express my deepest gratitude to my advisor, Professor Tribikram Kundu
of the Department of Civil Engineering and Engineering Mechanics, University of
Arizona, for giving me the opportunity to work with him, and his invaluable guidance. I
also thank him for sharing his inspiring work ethic, and for showing me how to be a good
educator.
I am grateful to the members of my research committee, Prof. George Frantziskonis,
Prof. Lianyang Zhang ,Prof. John M. Kemeny and Prof. Hamid Saadatmanesh for their
comments which helped me improve this work.
My sincere thanks always remain with my remarkable friends for always being there, as
well as for constant entertaining moments we shared throughout the years.
I thank my parents, my parents-in-law, my sister, brother and my brother-in-law. Without
their never-ending love and support, I would not be where I am today.
Finally, I would like to express my deepest appreciation to my husband for his
continuous inspiration and support.
5
DEDICATION
This dissertation is dedicated to my husband, Davoud Zamani. I give my deepest
expression of love and appreciation for the encouragement that he gave and the sacrifices
he made during this graduate program.
6
TABLE OF CONTENTS
ABSTRACT…………………………………………………………………7
CHAPTER I:.INTRODUCTION………………………………………........9
Objective…..………………………………………………………….10
Background……...…………………………………………………….11
CHAPTER II: PRESENT STUDY…………………………………….…..18
REFERENCES………………….………………………………………….21
APPENDIX A: AN IMPROVED ALGORITHM FOR DETECTING
POINT OF IMPACT IN ANISOTROPIC INHOMOGENEOUS
PLATES…………………………………………...………………………25
APPENDIX B: DETECTING THE POINT OF IMPACT ON A
CYLINDRICAL PLATE BY THE ACOUSTIC EMISSION
TECHNIQUE…………… ……………………………………………........48
APPENDIX C: DETECING THE POINT OF IMPACT ON AN
ANISOTROPIC CYLINDRICAL SURFACE USING ONLY FOUR
ACOUSTIC SENSORS………………... …………………………………..61
APPENDIX D: IMPACT LOCALIZATION ON A CYLIDRICAL PLATE
BY NEAR-FIELD BEAMFORMING ANALYSIS ……………………….72
APPENDIX E: SCATTERING OF FOCUSED ULTRASONIC BEAMS BY
TWO SPHERICAL CAVITIES IN CLOSE PROXIMITY………………....85
7
ABSTRACT
This work has two parts. The first part of the work (in Chapters II, III, IV and V) presents
a method for locating the point of impact using acoustic emission techniques.
The second part of the work is modeling the ultrasonic fields generated by one and two
spherical cavities placed in front of a point focused acoustic lens using the semi-
analytical distributed point source method (DPSM).
Acoustic emission (AE) refers to the generation of transient elastic waves during the
rapid release of energy from localized sources within a material.
In this work the acoustic emission has been used for locating the point of impact on
anisotropic and homogeneous or non-homogenous flat plates and cylindrical structures.
In these cases the wave speed is a function of the angle of propagation. An optimization
function is introduced and minimized to get the location of the impact point.
This method has been used on a flat FRP (fiber reinforced polymer) plate. The proposed
new objective function reduces the amount of time needed for solving the problem and
improves the accuracy of prediction. After solving the flat plate problem the method is
extended to cylindrical structures for which the objective function is written in cylindrical
coordinates and the method is tested on a FRP shell.
In Chapter IV an alternative method is introduced called the near-field acoustic emission
(AE) beamforming method. It has been used to estimate the source locations by using a
8
small array of sensors closely placed in a local region. To validate the effectiveness of the
AE beamforming method a series of experiments on a FRP shell are conducted. The
experimental results demonstrate that the proposed method can correctly predict the point
of impact.
The semi-analytical mesh-free technique DPSM is then used to model the ultrasonic field
in front of a point focused acoustic lens; anomalies such as cavities are introduced in the
medium in front of the acoustic lens and the effect of those cavities are studied. Solution
of this problem is necessary to get an idea about when two cavities placed in close
proximity can be distinguished by an acoustic lens and when it is not possible.
10
1. Objective:
Objectives of this research are two folds - first to develop an acoustic emission technique
for localizing acoustic source in anisotropic plates and shells, and then to develop a semi-
analytical model to study the scattering of ultrasonic waves by spherical cavities in a
focused ultrasonic field.
The first part of this work presents the theory and experimental results for localizing the
point of impact in isotropic and anisotropic plates and shells by the acoustic emission
technique. Localizing the point of impact on an anisotropic structure is necessary for
detecting and repairing the delamination and other type of damage arising from an
impact. Anisotropic plates and shells made of fiber reinforced composites are being
increasingly used in various structures due to their superior stiffness and light weight
characteristics. Shock, impact, or repeated cyclic stresses can cause the laminate to
separate at the interface between two layers, a condition known as delamination.
Individual fibers can separate from the matrix e.g. fiber pull-out. In order to prevent such
incidents there is always a need to identify the location of the damage prior to failure.
The second part of this work presents a formulation based on the distributed point source
method for solving elastic wave scattering problems in presence of cavities in front of an
acoustic lens. The propagation of waves through a medium containing strong scatterers is
ubiquitous in nature. This is because generally inhomogeneities are always found in
materials. These inhomogeneities locally change the acoustic properties of the material.
11
Air cavities and solid inclusions in molten and solid metals are some examples of these
inhomogeneities. A large number of papers have been published on elastic wave
propagation through materials containing inclusions. In particular, scattering of elastic
waves by spherical inhomogeneities_(e.g. voids, inclusions and other types of defect) has
been investigated because of its importance in nondestructive testing and exploratory
geophysics. Detection and characterization of floating cavities in a liquid medium is
important for both materials science and medical applications, such as for characterizing
air bubbles in molten metal and blood.
2. Background
A popular method for detecting the point of impact is the acoustic emission technique.
Acoustic emission (AE) refers to the generation of transient elastic waves during the
rapid release of energy from localized sources within a material [1]. Since AE signals
usually arise from internal changes of a structure, such as crack growth, dislocation
movement in monolithic materials, fiber breakage, fiber-matrix debonding and impact of
foreign objects, AE technique is used as a non-destructive testing tool to localize and
evaluate structural damage [2,3]. Due to its potential advantages in Kinematic damage
monitoring and source localization, AE technique has led to many applications in a
variety of fields such as petrochemical industry, aerospace industry, material,
manufacturing processes, etc [4,5].
12
Anisotropic plates and shells such as fiber reinforced composites are being increasingly
used in various structures due to their superior stiffness and weight characteristics. Shock,
impact, or repeated cyclic stresses can cause the laminate to separate at the interface
between two layers, a condition known as delamination. Individual fibers can separate
from the matrix e.g. fiber pull-out. The best known failure of a brittle ceramic matrix
composite occurred when the composite tile on the leading edge of the wing of the Space
Shuttle Columbia fractured due to impact during take-off. It led to catastrophic failure of
the vehicle when it re-entered the Earth's atmosphere on February 1, 2003. In order to
prevent such incidents there is always a need to identify the location of the damage prior
to failure. As mentioned above one of the most important reasons for the composite
damage is impact load or foreign objects striking the composite structure.
Localizing the source of the damage or the damage initiation point is very important for
health monitoring of structures. Time difference of arrival is a conventional AE method
that has been validated in laboratory settings and has become the most popular tool to
estimate the AE source location. This technique has been mostly used for isotropic plates.
Using passive sensors attached to the isotropic plate the point of impact can be localized
by the acoustic emission method following the triangulation technique [6,7]. For
efficiently monitoring the plate the sensors need to be placed near the critical locations of
the plate [8-11]. After receiving the impact generated acoustic signals at three sensor
locations the triangulation technique is applied to detect the impact point in isotropic
plates. In anisotropic plates the wave speed is not the same in all directions and therefore
the triangulation technique does not work [12, 13, 14]. Previous efforts for locating the
13
acoustic emission source in anisotropic plates required the measurement of two dominant
pulses in a waveform whose speeds of propagation c1 and c2 were known. In that earlier
effort the receiving sensors were placed in an array - on the periphery of a circle or on
two orthogonal lines[15]. There were other restrictions in that analysis [16], such as the
requirement of orthorhombic or higher order of elastic symmetry for the solid. Although
the symmetry condition is approximately satisfied for most engineering materials, it may
not always be true. Even the widely used engineering materials such as the fiber
reinforced composite solids often violate this condition. Therefore, Lamb wave speeds
need to be obtained experimentally as a function of the propagation direction. Other
restrictions of those analyses involve a priori knowledge of the principal axes of the solid
and the requirement of orienting those along the coordinate axes of the specimen. Placing
the sensors on an array on principal planes of the material may not be satisfied for single-
crystal specimens that have been cut in an arbitrary orientation. The method proposed by
Castagnede et al. [16] is based on the quasi-longitudinal bulk wave speeds. Their method
works well for thick structures but fails for thin plates when sensors are placed far away
from the impact point because the received signal is dominated by the Lamb wave modes
while the contributions of the longitudinal and shear bulk waves are negligible.
Kundu et al. [10] proposed an alternative method which is based on minimizing a
nonlinear error function to find the point of impact. The original objective function
proposed in that reference was modified by Kundu et al. [17] to overcome the singularity
problem associated with that function. The objective function based technique works in
principle when a minimum of three different receiving sensors are placed randomly on
14
the plate. However, one difficulty associated with this algorithm is that it is very sensitive
to the time of detection and a small error in the measurements of the times of flight at a
sensor results in a large error in the impact location prediction. The reason for this super-
sensitivity of the impact point prediction on the time of flight measurement is that the
objective function generated from three transducers, when plotted on the x-y surface
shows a long valley. Points at various locations on this valley become the global
minimum points as the times of flight are slightly changed. Because of the presence of
noise in the received signals, there is always some error in the time of flight measurement
that results in a large uncertainty in the predicted location of the impact point. Another
shortcoming associated with the objective function introduced by Kundu et al. [17] is that
its expression becomes very long when the number of the receiving sensors increases to
four or more and requires a longer computational time.
Another alternative AE technique that has been used to localize the impact region and is
particularly suited for large plate-like reinforced concrete structures was proposed by
McLaskey et al. [18]. This technique is called time delay beam forming method. The
time delay beam forming is a method of filtering in both time and space, and the analysis
techniques are relevant to the study of signals generated by propagating waves. It has
been extensively used in radar[19], sonar [20], and exploratory seismology[21,22], and
has been utilized as a tool for noninvasive testing techniques for monitoring pipelines and
pressure vessels[23,24]. It has been infrequently used for active damage detection in civil
engineering materials [25,26], and was first used by McLaskey[18] for concrete structure
monitoring. This method was then used by He et al. [27] on a thin plate used in the
15
aviation field. All investigations on beam forming method has been limited to isotropic
materials in which the velocity of the wave propagation is not dependent on the direction
of the wave propagation. Here this technique is extended to anisotropic structures. The
shortcoming of the beam forming method is that an array of four sensors can only
identify the direction of the impact, and cannot predict the exact point of impact. There is
always a need to have another array of four sensors to precisely predict the point of
impact from the intersection point of the two directions predicted by the two arrays.
The propagation of waves through a medium containing strong scatterers is ubiquitous in
nature. This is because generally inhomogeneities are always found in materials. These
inhomogeneities locally change the acoustic properties of the material. Air cavities and
solid inclusions in molten and solid metals are some examples of these inhomogeneities.
A large number of papers have been published on elastic wave propagation through
materials containing inclusions and cavities. In particular, scattering of elastic waves by
spherical inhomogeneities_(e.g. voids, inclusions and other types of defect) has been
investigated because of its importance in nondestructive testing and exploratory
geophysics .
In physics and optics the multiple scattering theory has been studied extensively (electron
propagation in a random potential or propagation of light in turbid media) [28-32]. A
good review of the acoustic wave scattering by multiple scatterers can be also found in
Tourin et al. [33]. However, interaction between multiple cavities in a focused field has
not been investigated extensively either in acoustic or in electromagnetic literature.
16
In 80s and 90s investigators tried to use ultrasonic pulse-echo techniques with buffer rod
to detect bubbles [34, 35] but because of the lack of resolution and SNR (signal to noise
ratio) it was not very successful. In order to increase the quality of detection in late 90s
spherical focused lenses were used by Ihara et al. [36-38]. They used 10 MHz focused
ultrasound to detect 20 to 80 µm diameter particles in molten zinc at 650oC. Another
common method for detecting and sizing gas bubbles is pulsed Doppler ultrasound for
moving bubbles [39].
Acoustic microscopes use focused ultrasonic beams at high frequencies to image small
inclusions, cavities and cracks. The interaction between a spherical cavity in a solid or a
fluid medium and a focused ultrasonic beam has been investigated analytically earlier by
Lobkis et al.[40, 41] and Zinin et al.[42, 43]. These analytical investigations have several
restrictions that make the analytical method applicable only to high frequency focused
signal interacting with a small spherical cavity having a small eccentricity or offset from
the focal point; when it comes to solid the solution is even more restrictive such as the
signal duration should be sufficiently short such that the longitudinal and transverse
waves scattered by the cavity are separated in time and thus can be analyzed separately
[40-43]. Without these assumptions there is no analytical solution for this problem. The
single cavity problem has been solved semi-analytically with fewer restrictions by Placko
et al. [44]. They used a newly developed mesh-free technique called Distributed Point
Source Method or DPSM to model acoustic microscope lenses at high frequencies. The
DPSM technique for solving ultrasonic, electrostatic and electromagnetic problems was
developed by Placko and Kundu [45, 46]. Using DPSM, the ultrasonic field has been
17
computed in fluid media [47-49] and solid structures [50-52]. Kundu et al. [53]
successfully modeled the ultrasonic field generated in front of an acoustic lens in a
perfect fluid medium in absence of any inhomogeneity or anomaly. Placko et al. [44]
solved the problem of interaction between a focused ultrasonic beam and a cavity using
DPSM
19
The methods, results, and conclusions of this study are presented in the paper appended
to this dissertation/thesis. A summary of the important findings of this investigation is
documented below.
As it has been mentioned in the background the objective function that was originally
introduced, before this investigation started, had some shortcomings. In Appendix A of this
work the objective function is improved further to make it more efficient and less sensitive
to errors in the time of flight measurement. The number of sensors was increased to get
more accurate results. All these investigations were carried out on a flat plate. This
investigation is extended to cylindrical structures in appendices B and C. Cylindrical
structures have many applications in industry. Most fuel cylinders have cylindrical
geometry. Main bodies of space shuttles and air plane fuselages also have cylindrical shapes
As it has been mentioned earlier, the triangulation technique does not work for anisotropic
cylinders for which the wave speed is a function of the wave propagation direction. In
appendix B the point of impact is detected using the acoustic emission technique and
verified experimentally on an aluminum cylindrical shell. In appendix C a similar technique
is applied to an anisotropic cylindrical geometry made of fiber reinforced composite. The
cylindrical coordinates of the attached sensors and the times of flight of the arriving waves
at the sensor locations are used to detect the point of impact. The direction dependent
velocity profile in the cylinder wall is experimentally obtained from the sensors attached to
the cylinder. In the previous technique one shortcoming of obtaining the direction dependent
velocity profile in an anisotropic plate was the need to have a large number of sensors
20
attached to the plate. This shortcoming is avoided here by introducing a new method for
obtaining the velocity profile.
In appendix D the beam forming acoustic emission technique is investigated on an
anisotropic shell, the method is introduced and verified experimentally on a FRP shell.
The region of the impact is predicted using this method.
In appendix E the mesh free distributed point source method (DPSM) is used and the
scattering of the ultrasonic field by two cavities is investigated. Some simplifying
assumptions that can be used for solving scattering by a single cavity are not applicable
to problem geometries with two cavities. The field computed by a single cavity and two
cavities placed in close proximity are compared to study the resolution of the lens; or in
other words, what minimum distance is necessary for the lens to clearly distinguish the
two cavities. Effect of the cavity size and the ultrasonic wave length on the resolution
limit is also investigated.
21
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Source Method - Ultrasonic Field Modeling in Solid media”, [DPSM for Modeling
Engineering Problems], Eds. D. Placko and T. Kundu, John Wiley & Sons, 143-229,
2007.
51. S. Banerjee and T. Kundu, “Semi-analytical modeling of ultrasonic fields in solids
with internal anomalies immersed in a fluid”, Wave Motion, 45 (5), pp.581-595,
2008.
52. S. Das, C. M. Dao, S. Banerjee and T. Kundu, “DPSM modeling for studying
interaction between bounded ultrasonic beams and corrugated plates”, IEEE
Transactions on Ultrasonics, Ferroelectrics and Frequency Control, 54(9), pp. 1860-
1872, 2007.
53. Kundu, D. Placko, T. Yanagita and S. Sathish, “Micro Interferometric Acoustic
Lens: Mesh-Free Modeling with Experimental Verification”, Health Monitoring of
Structural and Biological Systems III, Ed. T. Kundu, SPIE's 16th Annual
International Symposium on Smart Structures and Materials & Nondestructive
Evaluation and Health Monitoring, San Diego, California, March 9-12, 2009, Vol.
7295(2), pp. 72951E-1 to 72950M-11.
25
APPENDIX A
AN IMPROVED ALGORITHM FOR DETECTING POINT OF
IMPACT IN ANISOTROPIC INHOMOGENEOUS PLATES
This work has been published in the Ultrasonics Journal:
T. Hajzargarbashi, T. Kundu, and S. Bland, “An improved algorithm for
detecting point of impact in anisotropic inhomogeneous plates” Ultrasonics,
Vol 51,pp. 317 -324, 2011
26
An Improved Algorithm for Detecting Point of Impact in Anisotropic
Inhomogeneous Plates
Talieh Hajzargerbashi1, Tribikram Kundu
1 and Scott Bland
2
1Department of Civil Engineering & Engineering Mechanics, University of Arizona, Tucson, AZ85721,
USA
2NextGen Aeronautics Inc. ,500 StinsonDr., Danville, VA 24540, USA
Abstract:
Conventional triangulation techniques fail to correctly predict the acoustic source
location in anisotropic plates due to the direction dependent nature of the elastic wave
speeds. To overcome this problem, Kundu et al. [1] proposed an alternative method for
acoustic source prediction based on optimizing an objective function. They defined an
objective function that uses the time of flight information of the acoustic waves to the
passive transducers attached to the plate and the wave propagation direction (θ) from the
source point to the receiving sensors. Some weaknesses of the original algorithm
proposed in Reference [1] were later overcome by developing a modified objective
function [2]. A new objective function is introduced here to further simplify the
optimization procedure and improve the computational efficiency, and a new source
location algorithm is introduced to increase the source location accuracy. The
performance of the objective function and source location algorithm were experimentally
verified on a homogeneous anisotropic plate and a non-homogeneous anisotropic plate
with a doubler patch. Results from these experiments indicate that the new objective
function and source location algorithm have improved performance when compared with
those discussed in References [1,2].
1. Introduction:
Anisotropic plates and shells such as fiber reinforced composites are being increasingly
used in various structures due to their superior stiffness and weight characteristics. Shock,
impact, or repeated cyclic stresses can cause the laminate to separate at the interface
between two layers, a condition known as delamination. Individual fibers can separate
from the matrix e.g. fiber pull-out. The best known failure of a brittle ceramic matrix
composite occurred when the composite tile on the leading edge of the wing of the Space
Shuttle Columbia fractured due to impact during take-off. It led to catastrophic failure of
the vehicle when it re-entered the Earth's atmosphere on February 1, 2003. In order to
prevent such incidents there is always a need to identify the location of the damage prior
to failure. As mentioned above one of the most important reasons for the composite
27
damage is impact load or foreign objects striking the composite structure. In this paper an
algorithm for accurately predicting the impact location is given.
Ultrasonic transducers are generally used in two modes, commonly known as active and
passive modes [3], for monitoring structural damage. Under active mode monitoring,
acoustic actuators generate ultrasonic signals [4] and under passive mode monitoring the
impact of foreign objects or crack initiation/growth act as the acoustic source [5, 6]. The
proposed algorithm is based on the passive mode acoustic emission data.
For isotropic plates, the point of impact can be located using passive sensors [5, 6]. The
sensors should be placed at critical locations of the structure to efficiently monitor its
condition [7-12]. After receiving the impact generated acoustic signals at three sensor
locations the triangulation technique is applied to detect the impact point in isotropic
plates. However, if the plate is anisotropic then the triangulation technique does not work
because the wave speed is different in different directions. In a composite plate the
direction dependent velocity profile depends on the specific stacking sequence of the
layers [1, 13, and 14]. Previous efforts for locating the acoustic emission source in
anisotropic plates required the measurement of two dominant pulses in a waveform
whose speeds of propagation c1 and c2 were known, In that earlier effort the receiving
sensors were placed in an array - on the periphery of a circle or on two orthogonal lines
[15]. There were other restrictions in that analysis [16], such as the requirement of
orthorhombic or higher order of the elastic symmetry for the solid. Although the
symmetry condition is approximately satisfied for most engineering materials, it may not
always be true. Even the widely used engineering materials such as the fiber reinforced
composite solids often violate this condition [1, 2]. Therefore, Lamb wave speeds need to
be obtained experimentally as a function of the propagation direction. Other restrictions
of those analyses involve a priori knowledge of the principal axes of the solid and the
requirement of orienting those along the coordinate axes of the specimen. Placing the
sensors on an array on principal planes of the material may not be satisfied for single-
crystal specimens that have been cut in an arbitrary orientation. The method proposed by
Castagnedeet al. [16] is based on the quasi-longitudinal bulk wave speeds. Their method
works well for thick structures but fails for thin plates when sensors are placed far away
from the impact point because the received signal is dominated by the Lamb wave modes
while the contributions of the longitudinal and shear bulk waves are negligible.
An alternative method was proposed by Kundu et al. [1]. This method minimizes a
nonlinear error function to locate the impact point. The original objective function
proposed in Reference [1] was modified by Kundu et al. [2] to overcome problems
associated with the singularity. The objective function based technique works in principle
28
when a minimum of three different receiving sensors are placed randomly on the plate.
However, one difficulty associated with this algorithm is that it is very sensitive to the
time of detection and a small error in the measurements of the times of flight at a sensor
results in a large error in the impact location prediction. The reason for this super-
sensitivity of the impact point prediction on the time of flight measurement is that the
objective function generated from three transducers has a long valley. Points at various
locations on this valley become the global minimum points as the times of flight are
slightly changed. Because of the presence of noise in the received signals, there is always
some error in the time of flight measurement that results in a large uncertainty in the
predicted location of the impact point. Another shortcoming associated with the objective
function introduced by Kundu et al. [2] is that its expression becomes very long when the
number of the receiving sensors increases to four or more which results in a longer
computational time. In order to overcome these difficulties, a new objective function is
introduced in this paper. The new function is relatively simpler and easier to implement.
With the new objective function, the run time is reduced and using the new algorithm the
error of the impact location prediction is also reduced.
2. Theory
Let the time of detection of the acoustic signal at the i-th station be denoted as . If the
time of impact is then the time of flight of the generated elastic wave from the impact
point to the receiving station location is
(1)
Note that in (1) both and are defined with respect to the same time of reference.
If the coordinates of three receiving sensors S1, S2 and S3 are ( ), ( )
and( ), respectively and the impact point coordinate is ( ) then the distances of
the three sensors from the impact point are given by
√( ) ( )
√( ) ( )
(2)
√( ) ( )
The times of flight of the elastic wave to the three sensor locations are denoted as ,
and , respectively. The velocity [c(θ)] of the wave in the plate is a function of the wave
propagation direction θ. The angle of the wave propagation direction from the impact
point ( ) to the station ( ), is measured from the horizontal axis and can be
obtained from the following equation
29
(
)
(3)
c( ) is the velocity in the direction of the line between the impact point and the i-th
sensor; therefore, one can write
( ) √( ) ( )
( ) √( ) ( )
(4)
( ) √( ) ( )
From (4) one can obtain
√( )
( )
( ) √( )
( )
( )
√( )
( )
( ) √( )
( )
( )
√( )
( )
( ) √( )
( )
( )
(5)
From (5) the error function or the objective function is obtained in the following form:
( )
{ ( ) ( )( ) √( ) ( )
( )
√( ) ( )
( )}
{ ( ) ( )( ) √( ) ( )
( )
√( ) ( )
( )}
{ ( ) ( )( ) √( ) ( )
( )
√( ) ( )
( )} (6)
Note in the error function or the objective function expression given in (6) the error E is a
function of ( ) which is the unknown impact location; other points ( ), ( ) and ( ) are the locations of the 3 receiving transducers in a specified coordinate
system and are known. The differences between the times of flight to different receiving
transducers are used in the objective function expression because it removes the need for
explicit knowledge of the time of impact, tc that one can easily show from (1). It should
also be noted that the times of detection can have high error because the exact time of
30
detection is often hidden in the noise; taking the difference between two times of
detection can reduce this error.
In (6) all three transducers are given the same weight or importance. ( ) is the wave
speed in the direction of the line connecting ( ) and ( ), the wave speeds are
different in different directions and are obtained experimentally. Ideally, for the correct
values of ( ) the error function should give a zero value, while for incorrect values
of ( ) it should give a positive value. Because all terms in the error function are
squared, E should be a positive value or zero. Therefore, the point which gives the least
value of the error function should be closest to the exact point of impact.
There are different methods of optimization that can be used for minimizing a function.
One method that has been investigated before [1, 2] is based on introducing a mesh grid
in the plate. After evaluating the nonlinear objective function at the grid points and
finding the coordinate of the grid point where the function value is minimum the impact
point is predicted. Accuracy of this technique depends on how fine a mesh is chosen.
The number of receiving transducers used for predicting the impact location can be
increased from three to four or a greater value. If four transducers are used in the
prediction then the error function changes to
( )
{ ( ) ( )( ) √( ) ( )
( )
√( ) ( )
( )}
+{ ( ) ( )( ) √( ) ( )
( )
√( ) ( )
( )}
+{ ( ) ( )( ) √( ) ( )
( )
√( ) ( )
( )}
+{ ( ) ( )( ) √( ) ( )
( )
√( ) ( )
( )}
+ { ( ) ( )( ) √( ) ( )
( )
√( ) ( )
( )}
+{ ( ) ( )( ) √( ) ( )
( )
√( ) ( )
( )}
(7)
The predictions can be improved further by placing more receiving sensors on the
structure. To be unbiased, the error function needs to include information from every
31
possible sensor pair. Therefore, an increase in the number of sensors gives an increase in
the number of terms in the error function, and therefore an increase in the run time of the
code. With three sensors the number of terms in the function is three (as given in Eq. 6);
by changing the number of sensors to four, the number of terms increases to six as one
can see in (7).
The general form of this objective function for n number of receiving sensors is given by:
( ) ∑ ∑ ( ( ) ( )( ) √( ) ( )
( )
√( ) ( )
( ))
(8)
Clearly for n number of sensors there are ( )
unique sensors pairs. The above
equation is valid for all possible combinations of ( ) and ( ), for which the
computed values should vary between
and
. Since the wave speed in and
( ) directions should be the same it is not necessary to consider any angle beyond
the boundaries
and
for computing the wave velocity in all possible
directions. Note that varying between
and
covers all possible directions. In
the following section the objective function that was used by Kundu et al.[2], shown later
in Equation (9) of this paper, will be called objective function 1 and the objective
function proposed in this paper Equations (6), (7) and (8) will be called objective
function 2.
3. Experimental Investigation
In order to simulate the impact on a plate, a steel ball of diameter 0.5 in (see Fig. 1) was
dropped on the plate, the ball weighs approximately 0.0185 lbs (9 grams) and was
dropped from a height of 4.5 ft (1.37 m) through a 0.5 in (12.7 mm) inner diameter PVC
guide pipe. This arrangement accurately controlled the ball drop height and guaranteed
that during repeated experiments the ball was striking approximately the same location of
the plate. The plate is a 44 in × 44 in (112 cm x 112 cm) composite plate composed of
four layers of 2/2 twill woven carbon fiber with a [0/90]s stacking sequence.
Wave speeds in different directions of the plate were obtained by placing 17 sensors at
11.25 degree angular spacing varying from -90o to +90
o as shown in Figure 2 and
dropping the steel ball on the center of the semicircle. The received signals were recorded
by PZT sensors mounted on the opposite sides (back) of the plate. Figure 3 shows the
received signal at one of the sensors. Ten AE signals were collected and averaged for
each sensor location. By measuring the time of arrival at each sensor and dividing the
radius of the circle by the arrival time the wave velocities in different directions are
calculated.
32
Experimentally measured guided wave speeds in the 0-90 cross ply composite plate
varying from - to + are shown in Figure 4. As expected, the wave speeds in the
fiber directions, and are relatively higher. Since the composite plate is not
perfectly symmetric the velocity profile is not symmetric about the zero degree line, the
wave speeds in the and directions are different. Wave speeds in the
and directions are the smallest. After experimentally obtaining the wave speeds
in 17 discrete angular directions, the wave speed in any angular direction [c(θ)] is
obtained by fitting a natural cubic spline through the experimental points, as shown in
Figure 4.
After obtaining the velocity profile, a second set of tests were carried out to predict the
impact location. A point was chosen randomly to be the impact point and the steel ball
was dropped on that point, four of the attached 17 transducers were chosen to be the
receiving sensors for the second set of experiments. Similar to the first set of experiments
ten signals were collected by every sensor and the average of these ten signals were used
as the receiving signal. Schematic diagram of the composite plate with mounted acoustic
emission sensors for the second set of experiments are shown in Figure 5a. In this figure
the impact point is shown by the star and the receiving sensor which collects the data is
the transducer number 7 in Figure 5a or 7, 8, 10 and 15 in Figure 5b. For every impact
test 4 sensors were chosen to collect the signals. The received signals are similar to the
signal shown in Figure 3. It is not easy to measure the exact time of arrival of the signals
from the time history plots because there is some ambiguity in these plots about the
starting point of the signals due to the presence of a low level noise in the time history
plots before the actual arrival time of the ultrasonic energy. The exact arrival time is
hidden in this noise. Therefore, the actual arrival times at different sensors are probably
smaller than the recorded times. However, since the objective function (see Equations 7
and 8) uses the difference in the recorded arrival times these small errors in the recording
should nullify one another and the final results should not be affected significantly. For
the first test the steel ball was dropped at a point whose coordinates are given by x = 29.4
in, y = 33.7 in, measured from the origin located at the bottom left corner of the plate and
the signals were recorded by the transducers 7, 8, 10, and 15 as shown in Figure 5b.The
following times given in Table 1, were recorded as the arrival times at the four sensors.
These times and the coordinates of the transducers were used as the inputs for the
MATLAB code that minimizes the objective functions. The results are shown in Figures
6 to 11.
Objective functions 2 (given in Equation 8) and 1 (described in reference 2, and given in
Equation 9 of this paper) using three transducers are so sensitive to the small variations of
the time of flight measurement, that by changing just one of the measured times of arrival
by a small amount (say 5%), the prediction can be significantly altered. It seems that
when the objective function 1 is used with three receiving transducers and a specified
(5% or 10%) variation in the arrival time is introduced the prediction points are scattered
over a wide region of the plate. When predicted impact points from different sets of
transducers are plotted on the same figure the predicted points from all sets go through a
common region which is very close to the actual impact point as discussed in detail in the
following section.
33
3.1. Results from Four Sets of Three Transducers
For the first prediction four different sets of transducers with three receiving sensors in
every set that differs by at least one transducer from the other sets are taken and the times
of flight are slightly varied (5%, 10% etc.). The developed algorithm finds the impact
point for small variations of the times of flight by plotting the global minimum points.
These points are located in the valley of the surface plot of the objective function
variation. As different sets of the receiving sensors are considered the valleys of the
objective function surface plots change. However, different valleys show a common
region of intersection. The global minima points predicted by different sets of receiving
sensors go through this common region. This common region or point is the predicted
impact location. It is found that the proposed objective function can accurately predict the
point of impact even with 10 percent variation in the time of flight measurement when
this approach is followed.
The four sensors listed in Table 1 were the first set of sensors that were used as the
receiving sensors; Predicted impact points from these four sets of receiving transducers
are shown in Figure 6. Predictions from different sets are denoted by different symbols in
the figure. Every point plotted in this figure is the impact point predicted using the arrival
times obtained from the recorded signals after artificially introducing up to 5% error.
About 50 points are plotted for every set of three transducers. The final prediction of the
impact location is the intersection point or common point of these different sets of
predicted points. In Figure 6 objective function 1 is used and the method of optimization
is the mesh grid technique, discussed in references 1 and 2. This technique was also used
in reference [14]. In the mesh grid technique first a rectangular mesh grid is formed on
the surface of the plate, then the objective function is calculated at the grid points. The y-
coordinates corresponding to the minimum values of the objective function for different
x-values are obtained, then among these multiple minima the absolute minimum value of
the objective function is identified; x and y values corresponding to this absolute
minimum are the coordinates of the impact point and are plotted with different symbols
for different sets of sensors. For each set of sensors 50 predictions are made for 50
different sets of arrival times having up to 5 percent error in evary set. One can see in
Figure 6 that the minimum points from a specific set of sensors are not located in a small
region but widely scattered along a line. This is because from the surface plot of the
objective function given in Figure 7 one can see that the minimum of the objective
function is not a clearly defined point but multiple minima exist along a long valley.
Figure 7 shows the surface plot of the objective function for the sensor set that includes
sensors 8, 10 and 15. When small errors (~5%) are introduced in the arrival times the
absolute minimum point moves from one point to another point in this valley.
Figure 8 is obtained from the same sets of receiving sensors with 5 % variations in the
arrival time while using the objective function 2. Predicted points are now less scattered
compared to Figure 6 except for one set that is plotted by square symbols (sensors 7, 8
and 10). It can be seen in Figure 8 that all predictions from one set of sensors (8, 10 and
34
15) are very close to the actual impact point. Therefore, the objective function 2 requires
less computational time and converges faster compared to the objective function 1.
3.2. Results from Four Transducers Working Simultaneously
When the signal is recorded by four transducers the point of impact can be predicted by
substituting the four arrival times in objective function 1 [14] or objective function 2
defined in this paper. The objective function 1 for four receiving sensors is given by
( ) ∑ ∑ ∑ ∑ [ ( ) ( )( ( ) ( ))
( ) ( ) ( ( ) ( ))]
(9)
In which tij (= ti - ti) is the difference between arrival times at i-th and j-th sensors and di
is the distance of the i-th sensor from the point of impact.
√( ) ( )
(10)
Note that di is the distance between the impact point ( ) and the ith
sensor( ). Objective function 2 (Equation 7) for four transducers working together has 6 terms in
comparison to the objective function 1 (Equation 9) that has 15 terms. Thus the
calculation time is significantly reduced for objective function 2. In Figures 9 and 10
objective functions 1 and 2 are used for predicting the impact point location using the
same input data but four sensors working together. It can be seen in these figures that
these two objective functions are less sensitive to the time of flight measurement error
when arrival times at all four sensors are considered in the objective function expression.
All of the predicted impact points were found to be very close to the actual point of
impact denoted by the black star. The prediction accuracy is almost same in Figures 9 and
10; however, the objective function 2 requires less computation time.
There is another type of error that can arise during the experimental investigaton; it is the
velocity profile measurement error. It is then investigated if the velocity profile
measurement error has the same effect as the time of the flight recording error. For this
investigation the recorded velocity profile, Figure 4, was artificially altered to introduce
up to 5 percent error. Predictions of the impact point using the altered velocity profile are
shown in Figures 11 and 12. Figure 11 is generated by giving uniform (5%) error in the
velocity measurement in all directions while Figure 12 is generated by giving random
(within 5%) error in different directions.
4. Results for Non-Homogeneous Plate:
The next set of tests were carried out with the same plate after attaching a patch to the
plate in order to determine how the prediction is affected by the plate inhomogenity. Two
sizes of doubler patches were used as the interfering objects on the wave propagation
paths. The doubler patches were made from the original plate material.
35
The first specimen was fabricated by attaching a small doubler patch (4 in.× 8 in or 10.16
cm x 20.32 cm) to the plate. Figure 13 shows the schematic diagram of the plate with the
patch and the receiving sensor locations. The lines show the signal propagation paths
from the impact point to the receiving sensors.
In order to determine the difference in response, the plates were impacted by the ball at
the same location with and without the doubler patch.. The same algorithm was used to
predict the impact location using the times of arrival got from the signals . The predicted
results are shown in Figure 14; objective function 2 using 4 sensors simultaneously was
used to predict these impact point locations. Different impact points are obtained by
introducing a random 5 percent variation in the arrival times.
For the other configuration shown in Figure 13(b), the impact point was changed and the
point of impact was predicted using the time of arrivals at sensors 4, 7, 11 and 15. Figures
15 and 16 show the predicted impact points using 4 sensors simultaneously and objective
function 2. Comparing Figures 15 and 16 one can say that although the attached doubler
patch reduces the accuracy of the impact point prediction, the overall impact location
performance is not significantly degraded.
The second doubler patch is a long strip (30 in × 4 in) as shown in Figure 17. In this case,
the doubler patch crosses more than half of the impact site to sensor paths. This test
configuration approximates the effect of the plate stiffener.
Table 2 indicates the time of arrival from the signals when there was no patch attached to
the plate and when the long strip was attached to the plate. Figures 18 and19 show the
predicted results from two different sets of sensors obtained using the second objective
function. In both cases the predicted impact points are found to be slightly on the left of
the true point of impact. This occurs because the wave speed data does not include the
doubler patch. The doubler patch affects the velocity profile but that change was not
considered in the analysis. If a new velocity profile is generated in presence of the patch
and that profile is used to predict the impact point then the prediction accuracy improves
as shown in Figures 20 and 21.
5. Conclusion
A new algorithm for accurately predicting the impact point on an anisotropic plate is
introduced and verified experimentally. The objective function proposed by Kundu et al.
[1,2] is modified to make it computationally more efficient. Using the modified objective
function and four sensors instead of three the prediction accuracy is significantly
improved. The algorithm has been tested on homogeneous as well as non-homogeneous
plates. Non-homogeneous plates were fabricated by stiffening the plate at selected
segments. Stiffening was achieved by applying a doubler patch at desired locations.
36
ACKNOWLEDGEMENT
This material is based upon the work supported by the Air Force Office of Scientific
Research (AFOSR) under Contract No. FA9550-09-C-0122. Opinions, findings,
conclusions and recommendations given in this paper are those of the authors and do not
necessarily reflect the views of AFOSR.
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Figure 1: Spherical steel impactor used in the experiment
Figure 2: 17 PZT sensors placed on a semi-circular arc on the composite plate for AE
experiment.
38
Figure 3: Received signal at sensor 15 generated by the impact on the plate.
Figure 4: Velocity (in/s) profile as a function of the wave propagation direction
Figure 5: a) Schematic diagram of the composite plate showing the impact point and the
wave path from the impact point to Sensor 7, b) Schematic diagram of the impact test
showing four sensors used to record the received signals from which the point of impact
is predicted.
39
Figure 6: Impact point prediction using objective function 1 and mesh grid optimization
technique.
Figure 7: Surface plot showing the variation of objective function 1 obtained from sensors 8, 10
and 15.
40
Figure 8: Impact point prediction using objective function 2 and mesh grid optimization
technique.
Figure 9:Impact point prediction from 4 receiving sensors using objective function 1 and the
mesh grid optimization technique.
41
Figure 10: Impact point prediction from 4 receiving sensors using objective function 2 and the
mesh grid optimization technique
Figure 11: Impact point prediction from 4 receiving sensors using objective function 2 and the
mesh grid oprimization technique when an uniform error on the velocity profile is imposed.
Figure 12: Impact point prediction from 4 receiving sensors using objective function 2 and the
mesh grid oprimization technique, when a nonuniform error on the velocity profile is imposed.
42
Figure 12: Impact point prediction from 4 receiving sensors using objective function 2 and the
mesh grid oprimization technique, when a nonuniform error on the velocity profile is imposed.
Figure 13: Schematic diagram of the plate and the patch adhered to the plate. The impact
point, the receiving sensor locations and different wave paths crossing the patch are
shown.
43
Figure 14: Predicted impact points using the 2nd
objective function and 4 sensors together
for the patch attached plate, see Figure 13 (a).
Figure 15: Predicted impact points using the 2nd objective function and 4 sensors together for the
patch attached plate; Figure 13 (b) shows the configuration.
44
Figure 16: Predicted impact points using the 2nd objective function and 4 sensors together for the
patch-free plate.
Figure 17: Long patch attached to the plate.
Figure 18: Predicting the impact point using sensors 4, 7, 9 and15 with the regular plate velocity
profile.
45
Figure 18: Predicting the impact point using sensors 4, 7, 9 and15 with the regular plate velocity
profile.
Figure 19: Predicting the impact point using sensors 3, 6, 10 and15 with the regular plate velocity
profile.
46
Figure 20: Predicting the impact point using sensors 4, 7, 9 and15 with the new velocity profile
obtained from the plate with doubler patch.
Figure 21: Predicting the impact point using sensors 3, 6, 10 and15 with the new velocity profile
obtained from the plate with doubler patch.
47
Table 1: Arrival times at four sensors.
Sensor Number Time of arrival (second)
7 2.375x10-4
8 1.9x10-4
10 1.13x10-4
15 1.625x10-4
Table 2: Arrival times measured in the sensors.
Sensor
Number
Time of arrival for the
plate with the
patch(seconds)
Time of arrival for
the plate without the
patch(seconds)
4 1.70 x10-4
1.80x10-4
7 2.25x10-4
2.20x10-4
9 2.45x10-4
2.55x10-4
15 4.60x10-4
4.50x10-4
Table 3: Arrival times measured in the sensors.
Sensor
Number
Time of arrival for the
plate with the
patch(seconds)
Time of arrival for
the plate without the
patch(seconds)
3 1.75x10-4
1.73x10-4
6 1.80x10-4
1.90x10-4
10 3.30x10-4
3.28x10-4
15 4.60x10-4
4.50x10-4
48
APPENDIX B
DETECTING THE POINT OF IMPACT ON A CYLINDRICAL
PLATE BY THE ACOUSTIC EMISSION TECHNIQUE
This work has been published in the SPIE proceedings:
T. Hajzargarbashi, H. Nakatani, T. Kundu and N. Takeda, “Detecting the
Point of Impact on a Cylindrical Plate by the Acoustic Emission
Technique”,Proceedings of SPIE 7981, 79810U, (2011).
49
Detecting the Point of Impact on a Cylindrical Plate by the
Acoustic Emission Technique
Talieh Hajzargarbashi1, Hayato Nakatani2, Tribikram Kundu1 and Nobuo Takeda2
1Department of Civil Engineering & Engineering Mechanics, University of Arizona, Tucson, AZ 85721,
USA
2Department of Frontier Science, University of Tokyo, Kashiwnoha, Chiba, Japan
Abstract:
An optimization based technique for detecting the impact point on isotropic and anisotropic flat plates
developed by Kundu and his associates [1-3] is extended here to the cylindrical geometry. An objective
function is defined that uses the cylindrical coordinates of four sensors attached to the cylinder and four
arrival times to locate the point of impact by minimizing the objective function that gives the least squares
error. The proposed technique is experimentally verified by predicting the points of impact and comparing
the predicted points with the actual points of impact.
Key Words: Lamb Wave, Impact, Acoustic Emission, Passive Monitoring, Cylindrical Surface,
Optimization.
1. Introduction Detecting the point of impact on an anisotropic plate is of interest for finding and fixing the delaminations
or any other types of defects arising from an impact. The first step is locating the impact point where the
plate has been hit. A popular method for detecting the point of impact is the acoustic emission technique.
This technique has been used on isotropic plates. Using passive sensors attached to the isotropic plate the
point of impact can be detected by the acoustic emission method following the triangulation technique
[4,5]. For efficiently monitoring the plate the sensors need to be placed near the critical locations of the
plate [6-11]. In anisotropic plates the wave speed is not the same in all directions and therefore the
triangular technique does not work [1, 12, 13], Kundu et al. [1] proposed an alternative method which is
based on minimizing a nonlinear error function to find the specific point which satisfies all equations. The
original objective function was modified by Kundu et al. [14] to be able to overcome the singularity
problems. It was then improved further [2, 3] to make the objective function simpler, shorter, more
accurate and less sensitive to errors in the time of flight measuremt. The number of sensors was increased
to get the more accurate result [2, 3, 14]. All these works reported on the acoustic emission technique have
been for detecting the point of impact on a flat plate. Cylindrical structures have many applications in
industry. Most of the fuel cylinders have cylindrical structures, Main bodies of space shuttles and air plane
fuselages have cylindrical shapes.
In 1978 Asty [15] used the triangulation technique to detect the point of impact on a spherical surface, then
in 1993 Barat et al. [16] detected the point of impact on a cylindrical surface using the triangulation
technique; none of these techniques have been experimentally verified. As it has been mentioned before the
triangulation technique does not work for an anisotropic cylinder for which the wave speed is a function of
the wave propagation direction.
50
In this paper an algorithm is introduced in which the cylindrical coordinates of the sensors attached to the
cylindrical body and the times of flight to the sensors are used to detect the point of impact. The direction
dependent velocity profile in the cylinder wall is experimentally obtained from the sensors attached to the
cylinder. The objective function which uses the cylindrical coordinates is introduced and verified
experimentally.
2. Formulation
Let the time of detection of the acoustic signal at the i-th station be . If the time of impact be then the
travel time for the signal from the impact point to the station location is
(1)
Note that in (1) both and are defined in the same time of reference.
Cylindrical coordinates of the receiving sensors S1, S2, S3 and S4 are (r, θ1, z1), (r, θ2, z2), (r, θ3, z3) and (r,
θ4, z4), respectively and the impact point coordinate is (r, θ0, z0) in which r is the radius of the cylinder. The
sensors can be attached on the outer or inner surface of the cylinder. The impact point can be also on the
outer or inner surface.
For the cylindrical arc θ is the angle measured from a reference axis and z is the vertical coordinate of the
sensors, as shown in Figure 1.
Figure 1: Schematic view of the cylinder and the sensors placed on the surface coordinates; coordinates r, θ and z are
defined here.
In order to be able to find the distance between the sensor and the point of impact the cylindrical surface is
unwrapped to form a flat surface, it makes the calculation easier. In this manner the cylindrical surface
becomes a rectangular plate with two side lengths equal to rxθtotal and the height of the cylinder. In which
θtotal is the angle formed by cylindrical arc at its center.
r
z
θ
S1
51
Figure 2: Unwrapped cylindrical surface forming a flat surface
As it has been shown in Figure 2, when the cylindrical surface is unwrapped to form a flat surface the
coordinates of the sensors and the impact point are mapped into the transformed coordinate system in
which the coordinates of the sensors are (rxθ, z) for all sensors and impact point as well.
After converting cylindrical coordinates to Cartesian coordinates the distance between the point of impact
and the sensors can be found easily, the distance of the four sensors from the impact point are given by
√( ) ( )
√( ) ( )
(2)
√( ) ( )
√( ) ( )
The times of travel of the wave to the four sensor locations are denoted as , , and , respectively and
the velocity [c(θ)] of the wave in the flat plate is a function of the wave propagation direction θ; therefore,
one can write
( ) √( ) ( )
( ) √( ) ( )
(3)
( ) √( ) ( )
( ) √( ) ( )
From (3) one can obtain
√( )
( )
( ) √( )
( )
( )
√( )
( )
( ) √( )
( )
( )
√( )
( )
( ) √( )
( )
( )
√( )
( )
( ) √( )
( )
( ) ( )
rxθtotal
Cylinder Height
r×θ1
z1
r×θ4
z4
52
√( )
( )
( ) √( )
( )
( )
√( )
( )
( ) √( )
( )
( )
The error function or the objective function with four arrival times (at four sensors S1, S2, S3 and S4) can
be written as:
( ) ( ) ( )( ) √( ) ( )
( )
√( ) ( )
( ) ( ) ( )( )
√( ) ( )
( ) √( ) ( )
( )
( ) ( )( ) √( ) ( )
( )
√( ) ( )
( ) ( ) ( )( )
√( ) ( )
( ) √( ) ( )
( )
( ) ( )( ) √( ) ( )
( )
√( ) ( )
( ) ( ) ( )( )
√( ) ( )
( ) √( ) ( )
( ) (5)
As it can be seen in the error function or the objective function (5) the error is a function of ( ) which
is the impact location and it is unknown, the other points which are( ) , ( ) , ( ) and ( ) are the locations of the four sensors in a specified coordination system which are known, the time of
arrivals can be recorded from the signals received by the receivers.
( ) is the wave speed in the direction of the line joining ( ) and ( ), the wave speed is
different in different directions and is obtained experimentally. Ideally, for the correct values of ( ) the error function should give a zero value, while for wrong values of ( ) it should give a positive
value so by minimizing the error function the point of impact ( ) is found.
There are different methods of optimization that can be used for minimizing this function; one method
generates mesh grid on the plate and finds the grid point corresponding to the minimum value of the
nonlinear objective function. This grid point gives the location of the impact point. Alternately, other
optimization schemes such as simplex algorithm or genetic algorithm can be also used.
The number of sensors can be increased for improving the accuracy of prediction. For n number of sensors
there are ( )
unique sensor pairs. To be unbiased, the error function needs to include information from
every unique sensor pair so by increasing the number of sensors the number of terms in the error function
or the objective function will increase and the run time of the code will also increase. With 3 sensors the
number of terms in the function is 3, by changing the number of sensors to 4 the number of terms increase
to 6.
Note that the angle of the wave propagation direction from the source ( ) to the station( ), is
measured from the horizontal axis and can be obtained from the following equation
(
) (6)
The above equation is valid for all possible combinations of ( ) and ( ) for which the Computed
values should vary between ⁄ and + ⁄ . Since the wave velocity in and ( ) directions
53
should be the same it is not necessary to consider any angle beyond the boundaries ⁄ and ⁄
for computing the wave velocity in all possible directions between ⁄ and ⁄
3. Experimental Investigation
The following experiment was carried out to simulate the impact on a curved plate. A flat aluminum plate
was transformed to a cylindrical plate as shown in Figure 3. Both flat plate and the cylindrical curved plate
were used in the experimental investigation. The flat plate had a dimension of 500 mm by 500 mm and four
acoustic sensors were attached to the plate at its four corners.
Figure 3: The flat aluminum plate is shown on the left; it is then transformed to a cylindrical shape as shown on the
right.
The impact on the aluminum plate is simulated by dropping a steel ball on a specific point. Figure 4 shows
the steel ball of 9.52 mm diameter and it weighs 4 grams.
Figure 4: The stainless steel ball which was dropped on the plate for impact simulation.
The ball was dropped from approximately 800 mm height through a pipe which guides the ball on a
specific impact point in multiple experiments. Figure 5 shows the arrangement of the guiding pipe and the
plate; this arrangement also accurately controlled the ball drop height and guaranteed that during repeated
experiments the ball was striking approximately the same location of the plate with almost the same
velocity.
Four receiving sensors are attached to the curved plate; these four sensors receive the impact generated
wave. In figure 6, S1, S2, S3 and S4 show the locations of the four sensors attached to the plate.
Properties of the cylindrical plate and the cylindrical coordinates of the sensors are shown in Tables 1and 2.
54
Table 1: Cylinder Dimensions
Cylinder radius 266.809 mm
Cylinder height 500 mm
Cylinder angle 107.3723 Degrees
Table 2: Coordinates of the four sensors attached to the cylinder
Coordinates of the sensors (r mm, θ Degrees, z mm)
S1 (266.809 , 91.2664, 425)
S2 (266.809 , 16.1058, 425)
S3 (266.809 , 16.1058, 75)
S4 (266.809 , 91.2664, 75)
An AE apparatus was used to obtain the signal at the receiving sensors, this apparatus is called CWM
(Continuous Wave Memory), which was developed by Dr. Ito at The University of Tokyo [17].
The direction dependent velocity profile is shown in figure 7; this figure shows the experimentally
measured wave speed in directions varying from - to + . Experimental data showed fluctuations near
+/- 45o. Taking average of multiple experiments reduced the fluctuations to some extent but could not
completely eliminate it as one can see in Figure 7.
Figure 5: The experimental set up, the guidance pipe and the curved plate
55
Figure 6: The schematic view of the aluminum plate and the location of the sensors on the plate, S1, S2, S3 and S4
show the sensors on the plate. The dimensions are in mm.
Figure 7: The wave propagation velocity profile of the curved aluminum plate which is a function of the propagation
direction
After obtaining the velocity profile, a second set of tests were carried out to predict the impact location. A
point was chosen randomly to be the impact point and the steel ball was dropped on that point using the
guidance pipe as shown in figure 5, the four sensors shown in figure 6 received the signal, 5 signals were
collected by every sensor and the average of the 5 signals were used to avoid the experimental noise. There
is always some ambiguity about the exact time of arrival since the signals always contain some noise.
However, since the objective function, given in equation 5, uses the difference in the recorded arrival times
these small errors in the recorded times should nullify one another and the final results should not be
affected significantly.
The time of flights obtained from the received signals and the coordinates of the attached sensors are given
as input to the Matlab code and the impact point is obtained as the output by minimizing the objective
function of equation 5. The predicted impact point and the exact impact point are plotted in the same figure.
These results are discussed in the following section.
4400
4600
4800
5000
5200
5400
90
81
72
63
54
45
36
27
18 9 0 -9
-18
-27
-36
-45
-54
-63
-72
-81
-90
Velocity (m/s)
Angle (Degree)
56
4. Prediction Results
Figure 8 shows the schematic unwrapped plate with the attached sensors (hollow circles) and the impact
points (solid circles) on it. Different points of impact were chosen at different locations on the plate to
investigate if 4 sensors and the selected objective function are capable of predicting the point of impact at
any location on the plate.
Figure 8: Schematic view of the unwrapped aluminum plate with the sensors attached to it (S1, S2, S3 and S4) and
random impact points (A, B, C and D)
The predicted results for the plate shown in figure 8 are presented in figures 9, 10, 11 and 12 for the impact
at points A, B, C and D ( shown in figure 8), respectively. The dots in these figures show the predictions
and the stars show the exact impact points. It can be seen that the predicted points are very close to the
exact impact points in all 4 tests.
S3(425,75)
S2(75,425) S1(425,425)
S3(75,75)
A(95,365)
B(165,225)
C(315,125)
D(265,285)
x
y
57
Figure 9: Predicted result for test A, the dots show the predicted impact points and the star shows the exact impact
location
58
Figure 10: Predicted result for test B, the dots show the predicted impact points and the star shows the exact impact
location.
59
Figure 11: Predicted result for test C, the dots show the predicted impact points and the star shows the exact impact
location.
Figure 12: Predicted result for test D, the dots show the predicted impact points and the star shows the exact impact
location
5. Conclusion
An alternative method of detecting the impact point on isotropic and anisotropic plates developed by
Kundu and his associates [1, 2] is extended to the cylindrical geometry. An objective function is defined
that uses the cylindrical coordinates of sensors attached to the cylinder and arrival times at the sensors to
locate the point of impact by minimizing the least squares error. The technique is experimentally verified
by carrying out tests on cylindrical plates using four sensors. The results show that by minimizing the
objective function introduced in this paper the impact point can be correctly predicted using the impact
generated elastic wave arrival times at the four sensors.
REFERENCES
18- T. Kundu, S. Das and K. V. Jata, “Point of Impact Prediction in Isotropic and Anisotropic Plates from the Acoustic Emission Data”, Journal of the Acoustical Society of America, Vol. 122 (4), pp. 2057-2066, 2007
19- T. Hajzargarbashi, T. Kundu, and S. Bland, “An improved algorithm for detecting point of impact in anisotropic inhomogeneous plates” Ultrasonics, Vol 51,pp. 317-324, 2011
60
20- T. Hajzargarbashi, T. Kundu, and S. Bland, “A New Algorithm for Detecting Impact Point in Anisotropic Plates by the Acoustic Emission Technique”, Health Monitoring of Structural and Biological Systems IV, Ed. T. Kundu, SPIE's 17th Annual International Symposium on Smart Structures and Materials & Nondestructive Evaluation and Health Monitoring, San Diego, California, March 7-11, 2010.
21- A. K. Mal, F. Shih and S. Banerjee, Acoustic Emission Waveforms in Composite Laminates under Low Velocity Impact, Proceedings of SPIE 5047 (2003) 1-12.
22- A. K. Mal, F. Ricci, S. Gibson and S. Banerjee, Damage Detection in Structures from Vibration and Wave Propagation Data, Proceedings of SPIE 5047 (2003) 202-210.
23- B. Köhler, F. Schubert and B. Frankenstein, Numerical and Experimental Investigation of Lamb Wave Excitation, Propagation and Detection for SHM, Proceedings of the second European Workshop on Structural Health Monitoring (2004) 993-1000.15
24- J. Park and F. K. Chang, Built-In Detection of Impact Damage in Multi-Layered Thick Composite Structures, Proceedings of the fourth International Workshop on Structural Health Monitoring (2003) 1391-1398.
25- A. K. Mal, F. Ricci, S. Banerjee and F. Shih, A Conceptual Structural Health Monitoring System Based on Wave Propagation and Modal Data, Str. Health Monit. : Int. J. 4 (2005) 283-293.
26- G. Manson, K. Worden, K. and D. J. Allman, Experimental Validation of Structural Health Monitoring Methodology II: Novelty Detection on an Aircraft Wing, J. Sound Vib. 259 (2003) 345-363.
27- S. C. Wang and F. –K Chang, Diagnosis of Impact Damage in Composite Structures with Built-in Piezoelectrics Network, Proceedings of SPIE 3990 (2000) 13-19.
28- S. S. Kessler, S. M. Spearing, and C. Soutis, Damage Detection in Composite Materials using Lamb Wave Methods, Smt. Mater. Str. 12 (2002) 795-803.
29- T. Kundu, S. Das and K. V. Jata, An Improved Technique for Locating the Point of Impact from the Acoustic Emission Data, Proceedings of SPIE 6532 (2007).
30- T. Kundu, S. Das and K. V. Jata, Point of Impact Prediction in Anisotropic Fiber Reinforced Composite Plates from the Acoustic Emission Data, Review of Progress in Quantitative Nondestructive Evaluation, Am. Inst. of Physics (2007).
31- T. Kundu, S. Das, S. A. Martin and K. V. Jata, “Locating point of impact in anisotropic fiber reinforced composite plates”, Ultrasonics, Vol 48, Issue 3, pp 193-201, July 2008
32- M. Asty, “Acoustic emission source location on a spherical or plane surface.” NDT Int. 11, pp 223-226 (1978)
33- P.Barat, P. Kalyanasundaram and B.Raj, “Acoustic emission source location on a cylindrical surface,” NDT & E Int. 26 pp 295-297 (1993)
34- K. Ito and M. Enoki: "Acquisition and Analysis of Continuous Acoustic Emission Waveform for Classification of Damage Sources in Ceramic Fiber Mat, Mater. Trans., 48(2007) 1221-1226.
61
APPENDIX C
DETECTING THE POINT OF IMPACT ON AN ANISOTROPIC
CYLINDRICAL SURFACE USING ONLY FOUR ACOUSTIC
SENSORS
This work has been published in IWSHM Conference proceedings:
T. Hajzargarbashi, H. Nakatani, T. Kundu and N. Takeda,” Detecting the
Point of Impact on an Anisotropic Cylindrical Surface using only Four
Acoustic Sensors”, The 8th International Workshop on Structural Health
Monitoring, Sep 13-15, 2011, Stanford University, Vol. 1, pp. 562-569,
2011.
62
Abstract:
An optimization based technique for detecting the point of impact on isotropic and
anisotropic plates was developed by Kundu and his associates. Acoustic sensors attached to
the plate record the arrival times of Lamb waves generated at the impact point. An objective
function is then minimized to obtain the impact location[1-3]. Recently this technique has
been extended to the cylindrical geometry. This optimization based technique has been
tested on both flat plates and cylindrical shells made of aluminum[4]. In this paper the
impact point on an anisotropic cylindrical shell geometry made of carbon fiber reinforced
composite is investigated. One shortcoming of the previous method of requiring a large
number of acoustic sensors to obtain the direction dependent velocity profile is also
overcome here. In the new method the velocity profile in the anisotropic shell is obtained
using only four sensors. Predicted points of impact on the anisotropic cylindrical shell are
compared with the actual impact points. Good agreement between the two sets is observed.
Key Words: Lamb Wave, Impact, Acoustic Emission, Passive Monitoring, Cylindrical
Surface, Optimization.
6. Introduction
Localizing the point of impact on an anisotropic plate is necessary for detecting and
repairing the delamination or any other type of defect arising from an impact. A popular
method for detecting the point of impact is the acoustic emission technique. This technique
has been mostly used on isotropic plates. Using passive sensors attached to the isotropic
plate the point of impact can be localized by the acoustic emission method following the
triangulation technique [5,6]. For efficiently monitoring the plate the sensors need to be
placed near the critical locations of the plate [7-12]. In anisotropic plates the wave speed is
not the same in all directions and therefore the triangulation technique does not work [1, 13,
14], Kundu et al. [1] proposed an alternative method which is based on minimizing a
nonlinear error function to find the point of impact. The original objective function proposed
in that reference was modified by Kundu et al. [15] to overcome the singularity problem
associated with that function. It was then improved further [2, 3] to make the objective
function more efficient and less sensitive to errors in the time of flight measurement. The
number of sensors was increased to get more accurate results [2, 3, 14]. All these
investigations were carried out on a flat plate. This investigation is extended to cylindrical
structures in this paper. Cylindrical structures have many applications in industry. Most fuel
cylinders have cylindrical geometry. Main bodies of space shuttles and air plane fuselages
also have cylindrical shapes.
63
In 1978 Asty [16] used the triangulation technique to detect the point of impact on a
spherical surface, then in 1993 Barat et al. [17] detected the point of impact on a cylindrical
surface using the triangulation technique; none of these techniques have been
experimentally verified. As it has been mentioned before the triangulation technique does
not work for an anisotropic cylinder for which the wave speed is a function of the wave
propagation direction. Kundu et al. detected the point of impact on an aluminum cylindrical
shell by the acoustic emission technique [4]. In this paper a similar technique is applied to an
anisotropic cylindrical geometry made of fiber reinforced composite. The cylindrical
coordinates of the attached sensors and the times of flight of the arriving waves at the sensor
locations are used to detect the point of impact. The direction dependent velocity profile in
the cylinder wall is experimentally obtained from the sensors attached to the cylinder. In the
previous technique one shortcoming of obtaining the direction dependent velocity profile in
an anisotropic plate was the need to have a large number of sensors attached to the plate.
This shortcoming is avoided here by introducing a new method for obtaining the velocity
profile.
7. Formulation 7.1. Introducing the optimization equation
Let the time of detection of the acoustic signal at the i-th receiving station be . If the
time of impact be then the travel time for the signal from the impact point to the station
location is (1)
Note that in (1) both and are defined in the same time of reference. Cylindrical
coordinates of the receiving sensors S1, S2, S3 and S4 are (r, θ1, z1), (r, θ2, z2), (r, θ3, z3) and
(r, θ4, z4), respectively and the impact point coordinate is (r, θ0, z0) in which r is the radius of
the cylinder. The sensors can be attached on the outer or inner surface of the cylinder. The
impact point can be also on the outer or inner surface. For the cylindrical arc θ is the angle
measured from a reference axis, and z is the vertical coordinate of the sensors, as shown in
Figure 1(a). In order to be able to find the distance between the sensor and the point of
impact the cylindrical surface is unwrapped to form a flat surface; it makes the calculation
easier. In this manner the cylindrical surface becomes a rectangular plate with two side
lengths equal to rxθtotal and the length of the cylinder. In which θtotal is the angle formed by
the cylindrical arc at its center. As it has been shown in Figure 1(b), when the cylindrical
surface is unwrapped to form a flat surface the coordinates of the sensors and the impact
point are mapped into the transformed coordinate system in which the coordinates of the
attached sensors and the impact point can be expressed as (rxθi, zi). In this manner after
converting cylindrical coordinates to Cartesian coordinates the distance between the point of
impact and the i-th sensor can be found easily,
√( ) ( )
i=1,2,3,4 (2)
64
The travel time of the wave to the i-th sensor is denoted as and the velocity [c(θ)] of
the wave in the flat plate is a function of the wave propagation direction θ; therefore, one
can write
Figure 1: (a) Schematic view of the cylinder and the sensors placed on the cylindrical surface; coordinates
r, θ and z are defined here (b) Unwrapped cylindrical surface forming a flat surface.
( ) √( ) ( )
i=1,2,3,4 (3)
From (3) one can obtain
√( )
( )
( ) √( )
( )
( )
( )
The error function or the objective function with four arrival times (at four sensors S1,
S2, S3 and S4) can be written as equation (5)
As it can be seen in Eq. (5) the error function or the objective function value is a
function of ( ) which is the impact location that is unknown, the other points ( ), ( ), ( ) and ( ) are the locations of the four sensors that are known. The time
of arrival can be recorded from the signals received by the receivers.
( ) is the wave speed in the direction of the line joining ( ) and ( ), the
wave speed is different in different directions and is obtained experimentally. Ideally, for
the correct values of ( ) the error function should give a zero value, while for wrong
values of ( ) it gives a positive value. Therefore, by minimizing the error function
the point of impact ( ) can be found. Note that the angle of the wave propagation
direction from the source ( ) to the station ( ), is measured from the horizontal
axis and can be obtained from the following equation
r
z
θ
S1
(a) (b) (a) (b)
r×θ1
z1
rxθtotal
Cylinder Height
r×θ4
z4
65
( ) ( ) ( )( ) √( ) ( )
( )
√( ) ( )
( ) ( ) ( )( )
√( ) ( )
( ) √( ) ( )
( )
( ) ( )( ) √( ) ( )
( )
√( ) ( )
( ) ( ) ( )( )
√( ) ( )
( ) √( ) ( )
( )
( ) ( )( ) √( ) ( )
( )
√( ) ( )
( ) ( ) ( )( )
√( ) ( )
( ) √( ) ( )
( )
(5)
(
) (6)
The above equation is valid for all possible combinations of ( ) and ( ) for
which the Computed values should vary between ⁄ and + ⁄ . Since the wave
velocity in and ( ) directions should be the same it is not necessary to consider any
angle beyond the boundaries ⁄ and ⁄ for computing the wave velocity in all
possible directions between ⁄ and ⁄ .
7.2. Measurement of wave speeds in different directions
Figure 2 shows the unwrapped plate with 4 sensors attached to it at the 4 corners
and S4. Let the impact point be A, the wave propagates in all directions. Let the
velocity of the wave in direction from A to be , the wave speed in the direction from A
to should be the same if the impact point happens to be on the line connecting and
. From equations 3 and 1 the velocity in this direction can be found using the lengths of
the lines connecting A to and as follows:
( )
So from equation 7 by measuring the distances of the impact point and the sensors and
the time of detection on those two sensors the velocity in that direction can be found.
Knowing the velocity equation 7 can be solved for , the time of impact
(8)
Substituting the time of impact in the following equation the velocity can be calculated
in the direction that connects the impact point to that specific sensor
( )
(9)
66
8. Experimental Investigation
The following experiment was carried out to simulate the impact on a curved plate. Four
acoustic sensors were attached to four corners of a curved plate made of carbon fiber
reinforced composite (CFRC). The schematic diagram of the curved plate unwrapped on a
flat surface is shown in Figure 3(a), It is clear in Figure 3(a) that the plate has different
thicknesses and there are some alloy foil embedded in the plate. The impact on the FRP
plate is simulated by dropping a steel ball at a specific point. Figure 3(b) shows the steel ball
of 9.52 mm diameter that weighs 4 grams.
The ball was dropped from approximately 800 mm height through a pipe which guides
the ball to a specific impact point in multiple experiments. Figure 4 shows the
arrangement of the guiding pipe and the plate; this arrangement also accurately controlled
the ball drop height and guaranteed that during repeated experiments the ball was striking
approximately the same location of the plate with almost the same velocity. Four
receiving sensors are attached to the curved plate; these four sensors receive the impact
generated wave. In figure 5, S1, S2, S3 and S4 show the locations of the four sensors
attached to the plate.
Figure 2: Schematic view of the plate and the impact point for obtaining the velocity profile
An AE apparatus was used to obtain the signal at the receiving sensors, this apparatus is
called CWM (Continuous Wave Memory), which was developed by Dr. Ito at The
University of Tokyo [18].
𝑆
𝑑
𝑆
𝑑
𝐴
𝑑
𝑑
𝑆
𝑆
𝐵
67
Figure 3: (a) Schematic diagram of the unwrapped curved Composite plate showing the thickness variation
and other embedded material, (b) The stainless steel ball which was dropped on the plate for the impact
simulation.
Wave speeds in different directions of the plate were obtained by dropping the ball at
different locations on the two diagonal lines that connect the sensors placed at the diagonally
opposite directions as shown in Figure 5. By dropping the ball on a point the velocity can be
measured in two directions from equations 7 to 9. The received signals were recorded by
PZT sensors mounted on the opposite sides (back) of the plate. The direction dependent
velocity profile is shown in figure 6; this figure shows the experimentally measured wave
speeds in different directions varying from - to + . After obtaining the velocity profile,
a second set of tests were carried out to predict the impact location. A point was chosen
randomly to be the impact point and the steel ball was dropped on that point using the
guidance pipe as shown in figure 4, the four sensors shown in figure 5 received the impact
generated signal. Five signals were collected by every sensor and the average of the 5
signals were used to avoid the experimental noise. There is always some ambiguity about
the exact time of arrival since the signals always contain some noise. However, since the
objective function, given in equation 5, uses the difference in the recorded arrival times
these small errors in the recorded times should nullify one another and the final results
should not be affected significantly.
The times of flight obtained from the received signals and the coordinates of the
attached sensors are given as input to the Matlab code and the impact point is obtained as
the output by minimizing the objective function of equation 5. The predicted impact point
and the exact impact point are plotted in the same figure. These results are discussed in the
following section.
(a) (b)
68
9. Prediction Results
Figure 7(a) shows the schematic unwrapped plate with the attached sensors (hollow
circles) and the impact points (solid circles). Different points of impact were chosen at
different locations on the plate to investigate if 4 sensors and the selected objective function
are capable of predicting the point of impact at any location on the plate
Figure 4: The experimental set up, the guidance pipe and the cylindrical shell made of CFRP composite
Figure 5: Schematic view of the plate with four sensors attached to it, the red and black lines are for
obtaining the velocity in different directions
69
Figure 6: Experimentally obtained wave velocity in the curved composite plate as a function of the
propagation direction
4000
4500
5000
5500
6000
6500
-90 -80 -70 -60 -50 -40 -30 -20 -10 0 10 20 30 40 50 60 70 80 90 100
Angle (Degree)
Vel
oci
ty
(m/s
)
y
x
S4(1.08,0.15
)
S3(0.16,0.15
)
A(0.76,0.3
5)
C(0.52,0.69
)
S1(1.08,0.85
)
S2(0.16,0.85
)
B(0.71,0.75
)
(a) (b)
(c) (d)
70
Figure 7: (a) Schematic view of the unwrapped Composite plate with the sensors (S1, S2, S3 and S4)
attached to it. Random impact points are marked by A, B and C, Predicted results (dots) and exact impact
points (stars) for tests A, B and C are shown in figures (b), (c) and (d), respectively.
Predicted impact points are shown in figures 7 (b), (c) and (d) for the impact at locations
A, B and C (shown in figure 7(a)), respectively. The dots in these figures show the
predictions and the stars show the exact impact locations. It can be seen that the predicted
points are very close to the exact impact points in all 3 tests.
10. Conclusions
The optimization based method for detecting the impact point on isotropic and
anisotropic plates developed by Kundu and his associates [1, 2] is extended to the
cylindrical geometry. An objective function is defined that uses the cylindrical coordinates
of the attached sensors and the arrival times at the sensors to locate the point of impact by
minimizing an objective function. A new method that uses only four sensors for obtaining
the wave speeds in different directions is introduced. The technique is experimentally
verified by carrying out impact localization tests on cylindrical plates. The results show that
by minimizing the objective function introduced in this paper the impact point can be
correctly predicted.
REFERENCES
1. T. Kundu, S. Das and K. V. Jata, “Point of Impact Prediction in Isotropic and Anisotropic Plates from the
Acoustic Emission Data”, Journal of the Acoustical Society of America, Vol. 122 (4), pp. 2057-2066, 2007
2. T. Hajzargarbashi, T. Kundu, and S. Bland, “An improved algorithm for detecting point of impact in
anisotropic inhomogeneous plates” Ultrasonics, Vol 51,pp. 317-324, 2011
3. T. Hajzargarbashi, T. Kundu, and S. Bland, “A New Algorithm for Detecting Impact Point in Anisotropic
Plates by the Acoustic Emission Technique”, Proceeding of SPIE 7650, 7650C (2010)
4. T. Hajzargarbashi, H. Nakatani, T. Kundu and N. Takeda, “Detecting the Point of Impact on a Cylindrical
Plate by the Acoustic Emission Technique”,Proceeding of SPIE 7981, 79810U, (2011).
5. A. K. Mal, F. Shih and S. Banerjee, Acoustic Emission Waveforms in Composite Laminates under Low
Velocity Impact, Proceedings of SPIE 5047 (2003) 1-12.
6. A. K. Mal, F. Ricci, S. Gibson and S. Banerjee, Damage Detection in Structures from Vibration and Wave
Propagation Data, Proceedings of SPIE 5047 (2003) 202-210.
7. B. Köhler, F. Schubert and B. Frankenstein, Numerical and Experimental Investigation of Lamb Wave
Excitation, Propagation and Detection for SHM, Proceedings of the second European Workshop on
Structural Health Monitoring (2004) 993-1000.15
8. J. Park and F. K. Chang, Built-In Detection of Impact Damage in Multi-Layered Thick Composite
Structures, Proceedings of the fourth International Workshop on Structural Health Monitoring (2003)
1391-1398.
9. A. K. Mal, F. Ricci, S. Banerjee and F. Shih, A Conceptual Structural Health Monitoring System Based on
Wave Propagation and Modal Data, Str. Health Monit. : Int. J. 4 (2005) 283-293.
10. G. Manson, K. Worden, K. and D. J. Allman, Experimental Validation of Structural Health Monitoring
Methodology II: Novelty Detection on an Aircraft Wing, J. Sound Vib. 259 (2003) 345-363.
71
11. S. C. Wang and F. –K Chang, Diagnosis of Impact Damage in Composite Structures with Built-in
Piezoelectrics Network, Proceedings of SPIE 3990 (2000) 13-19.
12. S. S. Kessler, S. M. Spearing, and C. Soutis, Damage Detection in Composite Materials using Lamb Wave
Methods, Smt. Mater. Str. 12 (2002) 795-803.
13. T. Kundu, S. Das and K. V. Jata, An Improved Technique for Locating the Point of Impact from the
Acoustic Emission Data, Proceedings of SPIE 6532 (2007).
14. T. Kundu, S. Das and K. V. Jata, Point of Impact Prediction in Anisotropic Fiber Reinforced Composite
Plates from the Acoustic Emission Data, Review of Progress in Quantitative Nondestructive Evaluation,
Am. Inst. of Physics (2007).
15. T. Kundu, S. Das, S. A. Martin and K. V. Jata, “Locating point of impact in anisotropic fiber reinforced
composite plates”, Ultrasonics, Vol 48, Issue 3, pp 193-201, July 2008
16. M. Asty, “Acoustic emission source location on a spherical or plane surface.” NDT Int. 11, pp 223-226
(1978)
17. P.Barat, P. Kalyanasundaram and B.Raj, “Acoustic emission source location on a cylindrical surface,” NDT
& E Int. 26 pp 295-297 (1993)
18. K. Ito and M. Enoki: "Acquisition and Analysis of Continuous Acoustic Emission Waveform for
Classification of Damage Sources in Ceramic Fiber Mat, Mater. Trans., 48(2007) 1221-1226.
72
APPENDIX D
IMPACT LOCALIZATION ON A CYLINDRICAL PLATE
BY A NEAR-FIELD BEAMFORMING ANALYSIS
H. Nakatani, T. Hajzargarbashi T. Kundu and N. Takeda, “Impact
Localization on a Cylindrical Plate by a Near-Field Beamforming Analysis”,
Accepted to be published in SPIE Proceeding (2012).
73
Abstract:
Detecting the point of impact is of great importance in health monitoring of structural
systems especially those used in aviation fields. One candidate for the impact localization
method is the beamforming analysis proposed by McLaskey et al. [1], it requires only a
small array of 4 to 8 sensors. This technique is considered to be more suitable than
conventional time difference of arrival (TDOA) method because it is not influenced by
noise and dispersion of waves generated by the impact event. This beamforming method
with 4 sensors is extended here to thin cylindrical structures using guided Lamb waves. A
difficulty involved is that this technique which assumes constant wave speed in all
propagation directions does not work for anisotropic plates and cylinders. In order to
overcome this problem, the beamforming analysis in conjunction with an optimization
technique that introduces an objective function or error function is developed in this
study. The proposed technique is experimentally verified by comparing the predicted
values with the exact points of impact on a cylindrical FRP plate.
1. Introduction:
Source localization by the acoustic emission technique is necessary to identify the hot
spots of the structure. The localization of impact on a structure can direct further, more
detailed nondestructive analysis of the specified region. The popular and conventional
acoustic emission technique uses the time difference of arrival in the triangulation
technique. This method has been widely used on isotropic homogenous structures [2, 3]
and also has been extended to anisotropic plates [4]. The time difference of arrival has
been validated and used extensively for detecting the point of impact or crack growth
dislocation movement, fiber breakage and fiber matrix debonding. The time difference of
arrival scheme utilizes the difference in the times of arrival of various wave modes in
order to determine the source coordinates via triangulation. In acoustic emission work,
the arrivals of different wave modes are not easily identifiable so in order to get the time
74
difference of arrival usually the fastest propagating wave is determined for use in
acoustic emission source location methods. The source location method is typically
formulated as an inverse problem which relies on the very accurate determination of the
arrival time. In principle, it is also possible to solve the inverse problem such a way that
small errors in the arrival time do not produce large errors in the prediction [4].
One shortcoming of the conventional time difference method is that as the distance
between the source and the sensor increases the signal becomes more spread out and the
first arrival time of the weak signal becomes increasingly difficult to measure accurately.
For overcoming this problem usually the number of sensors on the surface is increased to
get a stronger signal at the sensor position.
Another difficulty of using the conventional method is encountered for anisotropic
structures for which the wave velocities in different directions are different. This
shortcoming is overcome here.
In the method described here a small array of sensors spaced closely together are used
instead of a distributed array of sensors on the surface. In the frequency range of interest,
all closely located sensors detect waves that propagate along similar paths and have been
affected by similar attenuation and scattering. This beamforming method was proposed
by McLaskey et al. [1] who used it for detecting the impact location in large concrete
structures. He et al. [5] then extended this method to the near-field beamforming in thin
isotropic plates[5]. They validated the effectiveness of the method by series of rotor-
stator rubbing experiments [5].
This paper attempts to explore the possibility of using the near-field beamforming
acoustic emission technique to locate the point of impact on a FRP cylindrical shell
which is an anisotropic structure. The theoretical fundamental is explained briefly and
then the method is validated by dropping a ball to simulate the impact on different
locations of a FRP cylinder. The results show that the beamforming acoustic emission
technique is an alternative method to the conventional acoustic emission technique.
75
2. Theoretical fundamentals:
Time delay beamforming is a method of filtering in both time and space, and the analysis
techniques are relevant to the study of signals generated by propagating waves. In
beamforming technique the assumption is that the characteristics of waves incident on the
array are relatively constant normal to their direction of propagation [6]. Under this
fundamental assumption, a signal recorded by one sensor in an array is expected to be a
time-delayed replica of a signal recorded by a neighboring sensor in that array. Acoustic
emission sources are usually considered point sources, so the delayed replica assumption
is only valid if the distance between the source and sensors is large compared to the
distance between the neighboring sensors.
Many different formulations for array signal processing have been tried out. Delay- and
sum is a simple and effective array signal processing algorithm utilized in beamfroming
technique [7]. This method is a generalized cross-correclation of the signal received in
array of sensors.
Comparing the distance between acoustic emission source and array of sensors, the
analysis schemes based on beamforming techniques can be classified as near-field and
far-field methods. The wave front form of the signal is assumed spherical due to the
transmission characteristic of waves. A common rule of thumb is that the near field
sources are located at a distance of
(1)
Where r is the distance from an arbitrary origin of the array, L is the largest dimension of
the array and λ is the wavelength [5,8].
Here the study is on the near-field source location in which the wave front is assumed to
be spherical. Figure 1 illustrates the incident spherical wave when the array of sensors
are attached to the plate.
76
Figure1: The spherical incident wave and the array of sensors focused on a sound source.
The sum of the signals received at the array can be expressed as
M
m
mmm rtxwM
trb1
1,
(2)
)(c
rrrr
m
m
(3)
In equations 2 and 3 ⃗ is the distance of the reference point to the focus point, ⃗⃗⃗⃗⃗ is the
distances of reference point to the m-th sensor. M is the total number of sensors and
the weighting coefficient applied to the channel of sensor m. The variable ( )
77
represents the signal acquired from the m-th sensor and rm
indicates the individual
time delay of m-th sensor to the reference point. ( ) is the propagation speed of the
sound wave which is a function of the direction of wave propagation [4]
By adjusting the time delay, rm
, the signals can be aligned in time before they are
summed. However, the signals cannot be aligned at the same wavefront when the array of
sensors is focused on another positions.
In this study, each signal was normalized by the peak value instead of using the
weighting coefficient. So the equation was modified as
M
m
mm rtxnM
trb1
1,
(4)
In which is the normalized signal received at m-th sensor.
When the focused point is at the impact point position (these two points are shown
separately in Figure 1) the value of the summation of the normalized signals becomes
maximum.
In equation 2 the magnitude of the distance vector can be calculated using the un
wrapping method, the cylindrical shell is unwrapped to a flat surface and the distance
between two points can be calculated from this flat surface [9]
3. Experimental validation:
The following experiment was carried out to simulate the impact on a curved plate. Four
acoustic sensors were attached in an array format at one corner of a curved plate made of
carbon fiber reinforced composite (CFRC). The schematic diagram of the curved plate
unwrapped on a flat surface is shown in Figure 2, the plate has different thicknesses and
there are some alloy foil embedded in the plate. The impact on the FRP plate is simulated by
dropping a steel ball at a specific point. Figure 3 shows the steel ball of 9.52 mm diameter
that weighs 4 grams.
78
The ball was dropped from approximately 800 mm height through a pipe which guides
the ball to a specific impact point in multiple experiments. this arrangement accurately
controlled the ball drop height and guaranteed that during repeated experiments the ball
was striking approximately the same location of the plate with almost the same velocity
Figure 4 shows the arrangement of the plate and the sensors. Four receiving sensors are
attached to the curved plate; these four sensors receive the impact generated wave. In
figure 2, S1, S2, S3 and S4 show the locations of the four sensors attached to the plate.
An AE apparatus was used to obtain the signal at the receiving sensors, this apparatus is
called CWM (Continuous Wave Memory), which was developed by Dr. Ito at The
University of Tokyo [10].
The received signals were recorded by PZT sensors mounted on the opposite sides (back)
of the plate. As mentioned above the wave speed is dependent on the direction of
propagation. Kundu et al. [11] used a method of deriving the velocity profile in different
directions on a FRP Cylinder. The direction dependent velocity profile is shown in figure
5; this figure shows the experimentally measured wave speeds in different directions
varying from - to + [11].
Using this velocity profile, a set of tests was carried out to predict the impact location. A
point was chosen randomly to be the impact point and the steel ball was dropped at that
point using the guidance pipe, the four array sensors shown in figure 2 received the
impact generated signals. Five signals were collected by every sensor and the average of
the 5 signals was used to reduce the experimental noise. Then the signal was normalized
with respect to the first maximum point. Figure 6 shows one of the signals and the first
peak point that had been used to normalize the signal.
79
Figure 2: Schematic diagram of the curved plate. S1, S2, S3 and S4 show the 4 sensors
attached to the plate. 1, 2, 3, 4 and 5 are the 5 different locations of the impact.
The delay time can be calculated using equation 3 and the total summation is calculated
for that specific focus point by equation 4. When the focus point is the point of impact the
value of the summation should be maximum because on that specific point the signals are
added together with their peaks on top of one another.
The normalized signal and the velocity profile were given as an input to the Matlab code
and the summation was plotted on the whole surface, the impact region can be detected
locating the region of the maximum value.
80
Figure 3: The stainless steel ball which has been used to simulate the drop.
Figure 4: The FRP cylindrical plate with sensors attached to it
Stainless steel ball 9.52mm dia. 4gr
81
Figure 5: Experimentally obtained wave velocity profile in the curved composite
plate as a function of the propagation direction
Figure 6: The signal received by sensor S1 and the arrow shows the location of the
peak that the signal was normalized with respect to this point.
4000
4500
5000
5500
6000
6500
-90 -80 -70 -60 -50 -40 -30 -20 -10 0 10 20 30 40 50 60 70 80 90 100
Angle (Degree)
Vel
oci
ty (
m/s
)
82
4. Prediction results:
The results are plotted for the unwrapped plate. Figures 7 (a), (b), (c), (d) and (e) are the
results for impacts 1 through 5 in Figure 2 respectively. In Figure 7 the red dot shows the
exact impact point and the white color shows the predicted impact region; as one can see
in these figures the exact point of impact is located on the white region or very close to it.
the point of impact is not predicted very precisely but the direction has been predicted
well.
\
(a) (b)
(c) (d)
83
(e)
Figure 7: The prediction results plotted on the unwrapped surface, the red dot shows
the exact impact point and the white region shows the predicted impact location.
The 3D surface plot of one of the experiments is shown in figure 8 as it is obvious in this
figure there is only one maximum point but there is a region where the value is
significantly larger than that of the other part of the surface.
Figure 8: 3D surface plot of the summation of normalized delayed signal on the
unwrapped surface
84
5. Conclusion:
A near-field beamforming acoustic emission technique is extended to cylindrical
anisotropic structures; this method is cheaper compared to the conventional acoustic
emission technique that requires many sensors because the beamforming technique
requires significantly fewer sensors. However it does not give the exact point of impact
from one cluster of sensors. It can be obtained from two clusters.
6. References:
1) G. C. McLaskey, S. D. Glaser and C. U. Grosse, “Beamforming array techniques for
acoustic emission monitoring of large concrete structures”, Journal of Sound and
Vibration, Vol. 329, pp. 2384-2394, 2010.
2) T. Kundu, N.K. Kishore, A.K. Sinha, A non-iterative partial discharge source location
method for transformers employing acoustic emission techniques, Appl. Acoust 70
(2009) 1378-1383
3) J.Jiao, C. He, B. Wu, R. Fei, X. Wang, Application of wavelet transform on modal acoustic
emission source location in thin plates with one sensor, Int J. Pressure Vessels Pipe, 81
(2004) 427-431
4) Talieh Hajzargerbashi, Tribikram Kundu and Scott Bland, “An Improved Algorithm for Detecting Point of Impact in Anisotropic Inhomogeneous Plates”Ultrasonics 51 (2011) 317–324
5) Tian He, Qiang Pan, Yaoguang Liu, Xiandong Liu, Dayong Hu, Near-field beamforming
analysis for acoustic emission source localization, Ultrasonics, In press.
6) D.Dundgeon Fundamentals of digital array processing, proceeding of IEEE 65 (6) (1977)
898-904
7) J. Yang, W.S.Gan, K.S. Tan, M.H. Er, Acoustic beamforming of a parametric speaker
comprising ultrasonic transducers, Sens. Actuator APhys. 125 (2005) 91- 99
8) J.R.Mailoux, Phased array antenna handbook, Norwood, Artech House Publishers, 2005
9) T. Hajzargarbashi, H. Nakatani, T. Kundu and N. Takeda, “Detecting the Point of Impact
on a Cylindrical Plate by the Acoustic Emission Technique”, Proceeding of SPIE 7981,
79810U, (2011).
10) K. Ito and M. Enoki: "Acquisition and Analysis of Continuous Acoustic Emission
Waveform for Classification of Damage Sources in Ceramic Fiber Mat, Mater. Trans.,
48(2007) 1221-1226.
11) T. Hajzargarbashi, H. Nakatani, T. Kundu and N. Takeda,” Detecting the Point of Impact
on an Anisotropic Cylindrical Surface using only Four Acoustic Sensors”, The 8th
International Workshop on Structural Health Monitoring, Sep 13-15 2011, Stanford
University.
85
APPENDIX E
SCATTERING OF FOCUSED ULTRASONIC BEAMS BY
TWO SPHERICAL CAVITIES IN CLOSE PROXIMITY
This work has been published in IEEE Transaction on Ultrasonics,
Ferroelectrics and Frequency control:
Talieh Hajzargerbashi, Ehsan Kabiri Rahani and Tribikram
Kundu,“Scattering of focused ultrasonic beams by multiple cavities” IEEE
Transaction on Ultrasonics, Ferroelectrics and Frequency control, Vol 58,No
8, pp-1619-1628, 2011
86
Abstract:
Ultrasonic fields generated by one and two spherical cavities placed in front of a point
focused acoustic lens are modeled by the semi-analytical distributed point source method
(DPSM). Results are generated by properly considering the interaction effect between
two cavities placed in the focused ultrasonic field. The interaction effect between the two
cavities prohibits the linear superposition of single cavity solutions to obtain the solution
for the two cavities placed in close proximity. Therefore, although some analytical and
semi-analytical solutions are available for the single cavity in a focused ultrasonic field,
those solutions cannot be simply superimposed for solving the two-cavity problem even
for a linear elastic material. Solution of this problem is necessary to get an idea about
when two cavities placed in close proximity can be distinguished by an acoustic lens and
when it is not possible. How the reflected ultrasonic energy from two small cavities and
one big cavity compares is also investigated.
I. INTRODUCTION:
The propagation of waves through a medium containing strong scatterers is ubiquitous in
nature [1]. This is because generally inhomogeneities are always found in materials.
These inhomogeneities locally change the acoustic properties of the material. Air cavities
and solid inclusions in molten and solid metals are some examples of these
inhomogeneities. A large number of papers have been published on elastic wave
propagation through materials containing inclusions. In particular, scattering of elastic
waves by spherical inhomogeneities_(e.g. voids, inclusions and other types of defect) has
87
been investigated because of its importance in nondestructive testing and exploratory
geophysics [2]. Detection and characterization of floating cavities in a liquid medium is
important for both materials science and medical applications, such as for characterizing
air bubbles in molten metal and blood.
In physics and optics the multiple scattering theory has been studied extensively
(electron propagation in a random potential or propagation of light in turbid media) [3-7].
A good review of the acoustic wave scattering by multiple scatterers can be also found in
Tourin et al. [8] However, interaction between multiple cavities in a focused field has not
been investigated extensively either in acoustic or in electromagnetic literature.
In 80s and 90s investigators tried to use ultrasonic pulse-echo techniques with
buffer rod to detect bubbles [9, 10] but because of the lack of resolution and SNR (signal
to noise ratio) it was not very successful. In order to increase the quality of detection in
late 90s spherical focused lenses were used by Ihara et al. [11-13]. They used 10 MHz
focused ultrasound to detect 20 to 80 m diameter particles in molten zinc at 650oC.
Another common method for detecting and sizing gas bubbles is pulsed Doppler
ultrasound for moving bubbles [14].
Acoustic microscopes use focused ultrasonic beams at high frequencies to image
small inclusions, cavities and cracks. The interaction between a spherical cavity in a
solid or a fluid medium and a focused ultrasonic beam has been investigated analytically
earlier by Lobkis et al.[15, 16] and Zinin et al.[17, 18]. These analytical investigations
have several restrictions that make the analytical method applicable only to high
frequency focused signal interacting with a small spherical cavity having a small
88
eccentricity or offset from the focal point; when it comes to solid the solution is even
more restrictive such as signal duration should be sufficiently short such that the
longitudinal and transverse waves scattered by the cavity are separated in time and thus
can be analyzed separately [15-18]. Without these assumptions there is no analytical
solution for this problem. The single cavity problem has been solved semi-analytically
with fewer restrictions by Placko et al. [19]. They used a newly developed mesh-free
technique called Distributed Point Source Method or DPSM to model acoustic
microscope lenses at high frequencies. The DPSM technique for solving ultrasonic,
electrostatic and electromagnetic problems was developed by Placko and Kundu [20, 21].
Using DPSM, the ultrasonic field has been computed in fluid media [22-24] and solid
structures [25-27]. Kundu et al. [28] successfully modeled the ultrasonic field generated
in front of an acoustic lens in a perfect fluid medium in absence of any inhomogeneity or
anomaly. Placko et al. [19] solved the problem of interaction between a focused
ultrasonic beam and a cavity using DPSM. In this research the scattering of the ultrasonic
field is investigated when two cavities are present in the medium including the interaction
effect between the two. Some simplifying assumptions that can be used for solving
scattering by a single cavity are not applicable to two-cavity case. The field computed by
a single cavity and two cavities placed in close proximity are compared to study the
resolution of the lens; or in other words, what minimum distance is necessary for the lens
to clearly distinguish the two cavities. Effect of the cavity size and the ultrasonic wave
length on the resolution limit is also investigated.
II. THEORETICAL FORMULATION
89
To obtain accurate information about the size and location of cavities using an acoustic
microscope, it is necessary to correctly model the interaction between the ultrasonic beam
generated by the acoustic microscope lens and multiple cavities. Even for the single
cavity case there is no analytical solution available for high eccentricity (distance
between the lens focal point and the cavity center), non-spherical shape of the cavity, or
when the cavity radius is not significantly smaller than the focal distance, so this problem
must be solved using numerical or semi-analytical techniques.
Finite element method is probably the most popular method for modeling the
engineering problems [29-35]. However, the finite dlement method requires a fine
meshing at high frequencies. As a result, 3D problems at high frequencies are
computationally very time consuming and sometimes impossible to solve [36]. The
alternative semi analytical approach that has been used by Plako et al. [19] is the mesh-
free technique called DPSM. In DPSM a number of point sources are distributed behind
the transducer face to model the transducer. The pressure field at position y in the fluid,
due to the point sources at position x distributed over surface S, can be expressed as [20]
S
fxdS
r
rikByp )(
4
)exp()(
(1)
In which B is proportional to the source velocity amplitude.
When the transducer surface is divided into small areas associated with the
source points then the above integral can be written in terms of the summation as follows:
90
N
m m
mf
m
N
m m
mf
mr
rikA
r
rikS
Byp
11
)exp()exp(
4)(
(2)
In which is the source strength of the m-th point source. Source strengths can be
assumed uniform over a transducer face for uniform vibration of the transducer. N is the
total number of point sources, is the distance between the m-th point source and the
target point or the observation point, kf is the wave number which has a real value for
materials without any attenuation or a complex value for materials with attenuation. In
this analysis kf is considered real. Superimposing the contributions of these source points
the pressure field for spherical and cylindrical focused lenses have been computed when
there is no inhomogeneity in front of the transducer [28]. DPSM has been used for
computing the scattered field generated by single spherical cavity [19] considering two
groups of point sources, one group on the boundary of the cavity and the second group on
the boundary of the lens. Final results are obtained by superimposing the contributions of
these two groups of point sources.
A major simplifying assumption for computing the scattered field by a small
cavity placed at a relatively large distance from the lens is to separately analyze the
incident field and the scattered field [19]. From the incident field analysis the pressure at
the cavity surface position is obtained in absence of the cavity then the negative of that
pressure field is applied on the cavity surface to get the scattered field. Although this
approach works well for the single cavity analysis it is not acceptable when two cavities
are present in close proximity. For the two-cavity case in addition to the lens generated
incident field the scattered field produced by one cavity affects the other cavity as well.
91
To model the ultrasonic field in presence of two cavities, the acoustic lens and the
two cavities must be analyzed simultaneously, not one cavity at a time. The point sources
need to be distributed on the two cavities as well as along the surface of the lens as shown
in Figure 1. The ultrasonic field at point P is obtained by superimposing the contributions
of all point sources.
Pressure and displacement fields at point P due to a single point source at a distance r
from point P is given by Banerjee and Kundu [25],
rik
f
jj
j
rik
f
f
er
ikr
xyu
r
ep
1
4
4
22
(3)
Where p is the pressure and ju is the displacement vector; the point source is located at
coordinate xj and the coordinate of point P is yj.
Several points like point P in Figure 1 are placed on the lens-fluid interface and
the cavity surfaces. The pressure and displacement fields at these points can be obtained
from Equation (3) for point sources of unit strength. For point sources with unknown
source strengths AS, AB1 and AB2 the pressure and displacement expressions at point P
contain these unknown source strengths. A matrix equation in the following form is
obtained by simultaneously satisfying the specified velocity (or displacement) boundary
conditions on the lens surface and the stress-free boundary conditions on the cavity
surfaces [21].
92
[
] {
} {
} (4)
If m, n1 and n2 point sources are used to model the lens surface and the cavity surfaces
then AS, AB1 and AB2 in Eq. (4) should have m, n1 and n2 elements, respectively. Vectors
VS, PB1 and PB2 on the right hand side are obtained from the prescribed boundary
conditions. For example, we can assume that the pressures PB1 and PB2 on the surface of
the two cavities are zero and the transducer surface velocity VS is uniform. VS vector
contains the prescribed velocity values on the lens surface at m points where small
spheres representing the point sources touch the lens surface. Similarly vectors PB1 and
PB2 contain the pressure values at n1 and n2 points on the cavity surfaces where the point
source spheres touch the cavity surfaces. Matrices M and Q relate the source strengths to
the particle velocity and pressure values, respectively. Note that MSS, MSB1, QB1S, MSB2,
QB2S, QB1B1, QB2B2 and QB1B2 matrices have dimensions m by m, m by n1, n1 by m, m by
n2, n2 by m, n1 by n1, n2 by n2 and n1 by n2, respectively. To obtain the source
strengths the system of equations given in Eq. (4) are to be solved.
If the resultant velocity on the transducer surface is specified as {VS} and the
pressure on the cavity surfaces are zero then the source strengths are obtained from the
following system of equations
[
] {
} { } (5)
93
However, if the pressure {PS} on the transducer surface instead of the velocity is
specified then the source strengths are obtained from the following equations
[
] {
} { } (6)
Both equations (5) and (6) require solution of a system of linear equations. This solution
is valid for any size of two cavities placed at any location. Interested readers are referred
to [20, 36] for the detailed forms of M and Q matrices used in Eqs. (5) and (6). After
obtaining the frequency domain solution as described above the time domain solution can
be obtained by applying Fast Fourier Transform (FFT) to the frequency domain solution
[37].
III. NUMERICAL RESULTS
Following the above formulation, the ultrasonic field in front of an acoustic lens (or
transducer) in presence of two (or more) cavities can be computed by solving a matrix
equation. The computed field for the two-cavity prolem is compared with the field
generated in absence of the cavity and in presence of only one cavity to see the effect of
the second cavity in close proximity.
The opening angle of the point focused lens (also known as the lens angle) and
the lens radius are 100o and 20 mm, respectively. The lens (or the transducer) is excited
at 1 MHz frequency. Note that modeling this large lens at 1 MHz frequency is equivalent
to modeling a much smaller lens, say 50 m radius with 100o lens opening angle,
94
operating at 400 MHz frequency because in these two cases the lens radius/wavelength
ratio is the same.
The lens surface is modeled by 4003 point sources, distributed slightly behind the
lens face as shown in Figure 1. The number of point sources is selected based on the
convergence criterion that the spacing between two neighboring point sources is less than
one-third wavelength [20]. Two cavities are placed with a horizontal spacing d between
the two cavity centers. These two cavities are denoted as the right and left cavities based
on their relative orientations. When the cavities are moved relative to the acoustic lens
whose position remains unchanged then the locations of the two cavities are denoted by
the coordinates of the center of the right cavity and the horizontal spacing between the
two cavity centers. If the distance between these two centers in Figure 1 is d then the
cavity locations for this figure are denoted as (0, y1) with a spacing d, implying the center
of the right cavity is located at coordinate point (0, y1) and the coordinate of the left
cavity center is (-d, y1). Origin of the coordinate system coincides with the focal point of
the lens. When only one cavity is analyzed then the left cavity is dropped.
The pressure fields computed in the fluid in presence of one cavity and two
cavities are shown in Figures 2a and 2b, respectively. For the case of one cavity the
cavity is placed at the focal point of the lens (0, 0) and the pressure field is plotted. For
the two-cavity modeling the left cavity is placed at (-0.4, 0) mm while the right cavity is
placed at the focal point (0, 0), as shown in Figure 1; corresponding pressure field is
95
shown in Figure 2b. One can see that the pressure field has changed relatively more on
the left side of the focal point, due to the presence of the second cavity, as expected.
It is then investigated if two small cavities close to each other have the same
effect as a bigger cavity at the same location. The pressure field is plotted in Figure 2c for
the case of one bigger cavity (of double diameter). The center of the bigger cavity is not
at the central axis of the lens but at (-0.2, 0) mm, which is the midpoint of two smaller
cavities of Figure 2b. One can see in this figure that the pressure fields look similar but
there are some differences between these two fields near the cavity location. However,
the two fields shown in Figures 2b and 2c are not distinguishable when moving away
from the cavities.
Two cavities of Figure 2b are then moved further away from each other and the
computed pressure fields are shown in Figure 3. It is evident in this figure that as the
distance between the cavity centers increases from 0.8 mm (Fig. 3a) to 2 mm (Fig. 3d)
the pressure field close to the cavities changes significantly. It should be noted in Figures
3a through 3d that the interference fringes just below the cavities diminishes as the
distance between the two cavities increases.
It should also be pointed out that the visible changes in the pressure field very
close to the cavities, as seen in Figures 2 and 3, do not help us much in detecting the
cavity, distinguishing the two cavities, or estimating the distance between the two cavities
because the sensing element is generally not placed so close to the cavity locations. For
cavity detection by the reflection mode acoustic microscope the acoustic lens is used for
96
transmitting the ultrasonic beam as well as receiving the reflected signal from the cavity.
The pressure field generated by the reflected ultrasonic energy from the cavity is
integrated over the lens surface to compute the acoustic force sensed by the lens due to
the reflected signal and is compared with the transmitted force, as was done by Placko et
al.[19] for the single cavity detection. It is shown there that the acoustic force (or the
integration of the pressure on the lens surface) varies noticeably as the cavity is moved
horizontally (right and left) or vertically (up and down) from the focal point. The same
method is used here to show the difference between the acoustic force when only one or
two cavities are present in front of the lens.
Figure 4 shows the normalized force sensed by the acoustic lens that is generated
by the ultrasonic beam reflected from the cavities. It is plotted as a function of the
vertical distance of the cavities from the horizontal plane going through the focal point.
The upward movement of the cavities is considered positive while the negative sign is
assigned to the downward movement. This sign convention is followed since in Figure 1
the y-coordinate is shown positive upward. In Figure 4 the solid line shows the reflected
force sensed by the acoustic lens from a cavity of radius 0.1 mm. The distance is denoted
as zero when the cavity center coincides with the focal point and it is positive when it
moves away from the acoustic lens. Note that the maximum value of the force is
obtained when the cavity is moved 0.2 mm towards the lens from the focal plane and it
decreases as the cavity moves up or down from that position; the dashed line shows the
reflected force from the two cavities with their centers 0.4 mm apart. As mentioned
before for the two-cavity case a distance equal to zero implies the center of the right
97
cavity coinciding with the focal point while the left cavity’s center is 0.4 mm left of the
focal point at coordinate (-0.4, 0) mm. The positive value of the distance indicates that
the two cavities moving away from the lens keeping the horizontal spacing between the
cavities unchanged. For this case also the maximum value is obtained when the cavities
are about 0.2 mm closer to the lens from the focal plane and it decays as the cavities
move away from this position. Note that the reflected force is stronger for the case of
two cavities in comparison to the single cavity case. The third curve – the dashed-dotted
line with markers – shows the reflected force from a single bigger cavity of radius 0.2
mm. In this case the maximum value of the reflected force is located at about the same
distance as the other two curves and its peak value is close to that of the two-cavity case.
The main difference between the force variations from the single big cavity and two
smaller cavities is that a slightly sharper dip is noticed for the two-cavity case.
In figures 5, 6 and 7 reflected forces are plotted when the cavities are placed on
the horizontal focal plane and moved in this plane to the right and left of the focal point.
In these figures three curves are plotted – one corresponding to a single small cavity
(continuous line), the second curve (dashed line) is for two small cavities separated by
some distance and the third curve (dashed-dotted line with markers) is for the single
bigger cavity. The x axis shows the horizontal distance of the right cavity from the focal
point. When there is only one cavity then there is no left cavity and the distance is
measured from the center of the cavity to the focal point. As indicated before the
distance from the focal point is positive when the cavity moves to the right and it is
negative when the movement is to the left. The y axis shows the reflected force which
98
has been normalized with respect to the maximum value. In all three figures (5, 6 and 7)
the maximum force is obtained from the single big cavity of radius 0.2 mm. The solid and
dashed-dotted curves corresponding to smaller and bigger single cavities, respectively
show perfect symmetry about the focal position as expected. The force value diminishes
as the cavity moves to the right or left by more than 1 mm.
The dashed curves that correspond to the two-cavity cases show some interesting
features. When the cavities are 0.4 mm apart the dashed curve is almost identical to the
dashed-dotted curve (see Figure 5). The only difference is that the peaks of the two
curves are off by 0.2 mm. This is because the midpoint of the two cavities is 0.2 mm off
from the center of the right cavity. If the distance of this midpoint (instead of the
distance of the center of the right cavity) from the focal point were plotted along the
horizontal axis then these two curves would have almost coincided. Clearly in this case
the acoustic lens cannot distinguish between one big cavity and two small cavities placed
close to each other.
In figures 6 and 7 the distance between the two cavities is increased to 0.8 mm
and 1.2 mm, respectively. In Figure 6 the maximum force from the two cavities is found
to be smaller than that from one big cavity but greater than that from one cavity of same
size. Note that as expected the symmetry line of the dashed curve in figure 6 is moved by
a distance of 0.4 mm to the right. 0.8 mm separation between the two cavities also
increases the width of the dashed curve by about 0.8 mm compared to the other two
curves. In figure 7 we see that as the distance between the centers of the two cavities is
99
increased to 1.2 mm clearly two peaks appear and the cavities become distinguishable.
Peak values for a single cavity and two cavities matched in this case because the cavities
are 1.2 mm apart while the influence of a single cavity beyond a distance of 1 mm from
its center is negligible. As expected in Figure 7 the line of symmetry for the dashed
curve moves 0.6 mm to the right. Theoretical curves for the single cavity problem
geometries are also plotted in Figure 7. Note that the theoretical curves match well with
the DPSM solutions.
Next it is investigated how the resolution power of the focused transducer
depends on the cavity size and the signal frequency. With this goal in mind figures 6 and
7 are regenerated after changing the cavity size and signal frequency. In Figure 8 the
spacing between the two cavity centers is kept constant at 0.8 mm as in Figure 6 but the
cavity diameters are reduced by a factor of 2 (Figure 8a), and increased by a factor of 2
(Figure 8b), then signal frequency is reduced by a factor of 2 (Figure 8c) and increased
by a factor of 2 (Figure 8d) in comparison to those values of Figure 6. Figure 9 is similar
to Figure 8 but the difference is that in Figure 9 the spacing between the two cavity
centers is 1.2 mm as in Figure 7 instead of 0.8 mm.
Figures 6, 8a and 8b show that when the cavity centers are 0.8 mm apart then they
cannot be distinguished even when the cavity diameters are reduced by 75% while
keeping the signal frequency unchanged. However, from Figures 6, 8c and 8d one can
see that for 0.5 MHz signal frequency (Figure 8c) one cavity of 0.2 mm diameter and two
cavities of 0.1 mm diameter each gives almost identical curves. When the signal
100
frequency is increased to 1 MHz (Figure 6) then these two curves show some difference
but still two peaks cannot be observed for the two-cavity case. Finally, when the
frequency is increased to 2 MHz (Figure 8d) then the lens can distinguish between the
two cavities – the curve shows two distinct peaks for the two-cavity geometry.
Next figures 7, 9a and 9b are compared. In all three cases two distinct peaks can
be seen for the two-cavity case indicating that even when the cavity diameter is increased
by 300% keeping the spacing between the cavity centers and the signal frequency
unchanged the resolution power of the lens is not compromised. However, when the
signal frequency is reduced to 0.5 MHz (Figure 9c) two distinct peaks disappear even for
1.2 mm spacing. As the frequency is increased to 1 MHz (Figure 7) two peaks can be
observed although they partly overlap and when the frequency is increased further to 2
MHz (Figure 9d) then two well separated peaks corresponding to two cavities can be
clearly seen.
Therefore, from figures 6, 7, 8 and 9 one can conclude that the capability of a
focused acoustic lens to distinguish between two cavities in close proximity does not
depend on the cavity size but it is strongly influenced by the signal frequency. From the
single cavity results presented in figures 6 to 9 it can be seen that for 0.5 MHz, 1 MHz
and 2 MHz signal frequency the effect of the cavity (influence zone) is extended to 2
mm, 1 mm and 0.5 mm, respectively from the center of the cavity. Therefore, if the
spacing between two cavity centers exceeds this influence zone then the two cavities can
be distinctly identified. Note that the wavelengths corresponding to these three
101
frequencies are 3 mm, 1.5 mm and 0.75 mm respectively. Therefore, the resolution
power of the point focused acoustic lens is approximately two-third of the wavelength.
As a result, cavities at a spacing of 0.4 mm could not be distinguished by any of these
three frequencies, while at 0.8 mm spacing only 2 MHz signal could distinguish the two
cavities and at 1.2 mm spacing both 2 MHz and 1 MHz signals could distinguish the
cavities but 0.5 MHz signal could not.
IV. CONCLUSIONS
Ultrasonic fields in front of a point focused lens in presence of single and two spherical
cavities are computed by semi-analytical DPSM formulation. The results are obtained
without ignoring any interaction effect between the two cavities or the cavities and the
lens. The main difference between the single cavity analyses available in the literature
and the two-cavity analysis presented here is that in the two-cavity case the presence of
the second cavity in close proximity affects the solution due to the first cavity. Because
of this interaction effect between the two cavities the total solution is not simply the
linear superposition of the two single cavity solutions. To correctly take into account this
interaction effect the two cavities should be considered concurrently in the model and all
boundary conditions on the lens and cavity surfaces must be satisfied simultaneously, as
done here. As mentioned earlier many simplifying assumptions for the single cavity
analysis cannot be used for solving the multiple-cavity problem.
102
The computed results show that when the distance between the two cavities
exceeds the radius of the influence zone (it is a function of the signal frequency) the
acoustic lens can distinguish the two cavities; otherwise the responses from two small
cavities and one big cavity show no difference. Therefore, for two cavities in close
proximity (within the influence zone or resolution limit of the acoustic lens) one cannot
conclude if the response is generated by single or multiple cavities. The resolution limit
does not depend on the cavity size but it is strongly influenced by the signal frequency. It
is approximately two-third of the wavelength.
Even when the spacing between two neighboring cavities is less than the
resolution limit of the lens, if the approximate size of the cavities is known then it is
possible to identify the presence of more than one cavity within the resolution limit since
the strength of the reflected signal depends on the cavity size. If the detected signal
strength exceeds the expected value for the known size of the cavity then one can
conclude that more than one cavity must be present with an inter-cavity spacing less than
the resolution limit of the lens.
Acknowledgement This research was financially supported by a research grant from the Air Force Office of
Scientific Research, contract number: FA9550-08-1-0318, Program Managers Dr. Victor
Giurgiutiu and Dr. David Stargel.
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103
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Figures
Figure 1: Problem geometry showing the distribution of point sources (small circles)
along the acoustic lens (or transducer) and the spherical cavities.
111
Figure 2: Computed pressure fields in front of the acoustic lens – (a) in presence of one
small spherical cavity (radius = 0.1 mm) located at the focal point, (b) in presence of two
small cavities (radius = 0.1 mm) one located at the focal point and the other one 0.4 mm
left of the focal point;, (c) in presence of one bigger cavity (radius = 0.2 mm) located at
0.2 mm left of the focal point. Numbers along the horizontal and vertical axes are given
in meters and denote positions of the field points in a Cartesian coordinate system
whose origin coincides with the bottom left corner of the figure. Scales are slightly
different in x and y directions. Note the changes in the pressure field slightly left of the
focal point
113
Figure 3: Computed pressure fields in front of the acoustic lens in presence of two small
cavities of radius = 0.1 mm as the distance between the two cavities is varied from 0.8
mm to 2 mm (a) 0.8 mm, (b) 1.2 mm, (c) 1.6 mm, and (d) 2.0 mm. Numbers along the
horizontal and vertical axes are given in meters and denote positions of the field points
in a Cartesian coordinate system whose origin coincides with the bottom left corner of
the figure. Scales are slightly different in x and y directions.
114
Figure 4: Normalized force when the cavities move vertically, away from the lens
(positive) or towards the lens (negative) from the focal plane. Distance denotes the
vertical distance of the cavities from the focal plane.
Figure 5: Normalized force sensed by the acoustic lens when the cavities move
horizontally on the focal plane. The distance between the cavity centers is 0.4 mm and
the signal frequency = 1 MHz. Distance denotes the horizontal distance from the focal
point to the center of the cavity (for the single cavity case) or the center of the right cavity
(for the two-cavity case).
115
Figure 6: Normalized force sensed by the acoustic lens when the cavities move
horizontally on the focal plane. The distance between the cavity centers is 0.8 mm and
the signal frequency = 1 MHz. Distance denotes the horizontal distance from the focal
point to the center of the cavity (for the single cavity case) or the center of the right cavity
(for the two-cavity case).
Figure 7: Normalized force sensed by the acoustic lens when the cavities move
horizontally on the focal plane. The distance between the cavity centers is 1.2 mm and
the signal frequency = 1 MHz. Distance denotes the horizontal distance from the focal
point to the center of the cavity (for the single cavity case) or the center of the right cavity
(for the two-cavity case).
117
Figure 8: Normalized force sensed by the acoustic lens when the cavities move
horizontally on the focal plane. The distance between the cavity centers is 0.8 mm, same
as in Figure 6. However, compared to Figure 6 the signal frequency or the cavity
diameters are changed. (a) Frequency = 1 MHz, smaller cavity diameter = 0.1 mm,
bigger cavity diameter = 0.2 mm. (b) Frequency = 1 MHz, smaller cavity diameter = 0.4
mm, bigger cavity diameter = 0.8 mm. (c) Frequency = 0.5 MHz, smaller cavity
diameter = 0.2 mm, bigger cavity diameter = 0.4 mm. (d) Frequency = 2 MHz, smaller
cavity diameter = 0.2 mm, bigger cavity diameter = 0.4 mm.
119
Figure 9: Normalized force sensed by the acoustic lens when the cavities move
horizontally on the focal plane. The distance between the cavity centers is 1.2 mm, same
as in Figure 7. However, compared to Figure 7 the signal frequency or the cavity
diameters are changed. (a) Frequency = 1 MHz, smaller cavity diameter = 0.1 mm,
bigger cavity diameter = 0.2 mm. (b) Frequency = 1 MHz, smaller cavity diameter = 0.4
mm, bigger cavity diameter = 0.8 mm. (c) Frequency = 0.5 MHz, smaller cavity
diameter = 0.2 mm, bigger cavity diameter = 0.4 mm. (d) Frequency = 2 MHz, smaller
cavity diameter = 0.2 mm, bigger cavity diameter = 0.4 mm.
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