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Tucson, 21 Nov 2002 Optical Sciences Colloquium 1
Geometrical Methods for Design of Laser Beam Shaping Systems
J.A. Hoffnagle & C. M. Jefferson, Appl. Opt. 39.30, 5488-5499, 2000.
David L. Shealy University of Alabama at Birmingham
Department of Physics, 1530 3rd Avenue South, CH310Birmingham, AL 35294-1170 USA
Tucson, 21 Nov 2002 Optical Sciences Colloquium 2
OUTLINE
• Overview of current practices and history• Geometrical methods for design• Applications:
Rotationally symmetric systems 1 mirror, 1 lens, 2 plano-aspheric lenses
Non-rotationally symmetric systems2 mirror with no central obscuration
Genetic algorithm optimization methods3-element spherical surface GRIN system
Tucson, 21 Nov 2002 Optical Sciences Colloquium 3
Current Practices of Beam Shaping*•Process of redistributing the irradiance and phase
•Two functional categories:•Beam Integrators•Field Mapping
*Laser Beam Shaping: Theory and Techniques, F.M. Dickey & S.C. Holswade,eds., Mercel Dekker, 2000;Laser Beam Shaping, F.M. Dickey & S.C. Holswade,eds., Proc. SPIE 4095, 2000;
Laser Beam Shaping II, F.M. Dickey, S.C. Holswade, D.L. Shealy, eds., Proc. SPIE 4443, 2001.Laser Beam Shaping III, F.M. Dickey, S.C. Holswade, D.L. Shealy, eds., Proc. SPIE 4770, 2002.
Tucson, 21 Nov 2002 Optical Sciences Colloquium 4
Beam Integrators
D
d
F f
S
Tucson, 21 Nov 2002 Optical Sciences Colloquium 5
Field Mapping Beam Shaper
Tucson, 21 Nov 2002 Optical Sciences Colloquium 6
Physical versus Geometrical Optics0 02 2
f r Yπβ
λ=
λ = wavelength, r0 = waist or radius of input beam, Y0= half-width of the desired output dimensionf = focal length of the focusing optic, or the working distance from the
optical system to the target plane
Beam Shaping Guidelines:β < 4, Beam shaping will not produce acceptable results4 < β < 32, Diffraction effects are significantβ > 32, Geometrical optics methods should be adequate
Tucson, 21 Nov 2002 Optical Sciences Colloquium 7
Historical Background• Frieden, Appl. Opt. 4.11, 1400-1403, 1965:
“Lossless conversion of a plane wave to a plane wave of uniform irradiance.”
• Kreuzer, US patent 3,476,463, 1969: “Coherent light optical system yielding an output beam of desired intensity distribution at a desired equi-phase surface.”
• Rhodes & Shealy, Appl. Opt. 19, 3545-3553, 1980: “Refractive optical systems for irradiance redistribution of collimated radiation – their design and analysis.”
• Cornwell, Ph.D. Dissertation, University of Miami, Coral Gables, 1980 and Proc. SPIE 294, 62-72, 1981: “Non-projective transformations in optics.”
Tucson, 21 Nov 2002 Optical Sciences Colloquium 8
Frieden, Appl. Opt. 4.11, 1400-1403, 1965:“Lossless conversion of a plane wave to a plane wave of uniform irradiance.”
( )( )
( )
122 2
max 2 2max
1 exp 2
1 exp 2
rR r R
r
α
α
− − = ± − −
• Intensity shaping leads to OPL variation of 20λ• Need to shape of output wavefront when phase is important• Frieden requires rays to be parallel Z-axis• Leads to OPL variation of λ/20
Conservation of Energy:
Tucson, 21 Nov 2002 Optical Sciences Colloquium 9
•Kreuzer, US patent 3,476,463, 1969: “Coherent light optical system yielding an output beam of desired intensity distribution at a desired equi-phase surface.”
Tucson, 21 Nov 2002 Optical Sciences Colloquium 10
Kreuzer, US patent 3,476,463, 1969.
( )
( )
20
2max 0
122
max 2
1( , )sin 01
θ−
−
−+ − =
−
r r
r r
er s S Re
R
•Conservation of Energy & Ray Trace Equations:
•Constant OPL:
( ) ( )1 1 cos 0d n n θ− + − =RMirror Surface Equations:
( )
( ) ( )( )
20 2 11
r drz rn dnR r
= −
− + −
∫ ( )( ) ( )
( )
= −
− + −
∫ 20 2 11
R dRZRn dnR r
Tucson, 21 Nov 2002 Optical Sciences Colloquium 11
Rhodes & Shealy, Appl. Opt. 19, 3545, 1980Jiang, Shealy, Martin, Proc. SPIE 2000, 64, 1993Energy Balance:
Ray Trace Equation: Constant OPL:
Tucson, 21 Nov 2002 Optical Sciences Colloquium 12
Cornwell, “Non-projective transformations in optics,” Ph.D. Dissertation, University of Miami, Coral Gables, 1980
Proc. SPIE 294, 62-72, 1981
• Differential Power
• Conservation of Energy: Ein=Eout
• Magnifications of ray coordinates
• OPL condition• Determine sag z(r) of
first surface• Determine inverse
magnification• Determine sag Z(R) of
second surface
( , ) ( , )in outI x y dxdy I X Y dXdY=
( )( )( )1 2
0
1( )x
xx
X x
a u dum x C C
x A um u
= +
∫
Tucson, 21 Nov 2002 Optical Sciences Colloquium 13
Overview of Geometrical Methods
• Conservation of energy within a bundle of rays – geometrical optics intensity law.
• Ray trace equations.
• Constant optical path length condition.
Tucson, 21 Nov 2002 Optical Sciences Colloquium 14
Geometrical Optics Intensity Law
• Conservation of energy within geometrical optics –intensity law – follows from scalar wave equation:
( )2 2 20 ( ) 0n k e∇ + =r 0 0Assume ( ) ( ) exp ( )e e ik S = r r r
( )2 2S n∇ =2 2
0 0 02 0e S e e S∇ ⋅∇ + ∇ =
( )
( )( ) ( )( )ˆ 0SI I
n ∇ ∇ ⋅ = ∇ ⋅ =
r r a rr
1 1 2 2I dA I dA=
Source
1 1I dA
2 2I dA
Tucson, 21 Nov 2002 Optical Sciences Colloquium 15
Ray Trace Equations
• Ray Trace Equations:
• Law Reflection & Refraction:
Tucson, 21 Nov 2002 Optical Sciences Colloquium 16
Constant Optical Path Length Condition
• Impose the constant optical path length condition for all rays:
OPL( ) ( , , )C
C n x y z ds= ∫( ) ( )OPL OPL r0 =
Tucson, 21 Nov 2002 Optical Sciences Colloquium 17
Summary of Geometrical Methods for Laser Beam Shaping
• Geometrical optics intensity law:( ) 0I∇ • =a
1 1 2 2I dA I dA=
Source
1 1I dA
2 2I dA
• Constant optical path length condition:0( ) ( )rOPL OPL=
Tucson, 21 Nov 2002 Optical Sciences Colloquium 18
Optical Design of Laser Beam Shaping Systems: Solution of Differential Equations
versus Global Optimization
• Geometrical methods leads to equations of the optical surfaces:
• Global Optimization with discrete & continuous variables:– Beam shaping merit function
Tucson, 21 Nov 2002 Optical Sciences Colloquium 19
One-mirror Profile Shaping System
• Ray trace equation
• Energy balance
• Differential equation of mirror
Tucson, 21 Nov 2002 Optical Sciences Colloquium 20
Beam Shaping Designs of McDermit, Ph.D Dissertation, University of Mississippi, 1972
Collimated Gaussian input beam uniformly illuminatingCylindrical receiver (McDermit, p. 84).
Tucson, 21 Nov 2002 Optical Sciences Colloquium 21
Two Element Beam Shaping Systems
• Equations of the optical surfaces:
( ) ( )0
2 r
inout
R r I u uduI
= ±
∫
( ) ( )OPL OPL r0 =
•Constant OPL:
•Conservation of Energy:
Tucson, 21 Nov 2002 Optical Sciences Colloquium 22
Two Lens Beam Shaping SystemJiang, Ph.D. Dissertation, UAB, 1993
Energy Balance:
Ray Trace Equation:
Constant OPL:
Tucson, 21 Nov 2002 Optical Sciences Colloquium 23
Surface Parameters of HeCd (441.57nm) Laser Beam Shaping system
( )( ) ∑
=
++−+
=5
2
2222
2
111 j
jj hA
hck
chhz
Tucson, 21 Nov 2002 Optical Sciences Colloquium 24
Input and Output Beam Profiles
Tucson, 21 Nov 2002 Optical Sciences Colloquium 25
Beam Shaping Applications
In a holographic projection processing system featured on 10 January 1999 issue of Applied Optics , a two-lens beam shaping optic increased the quality of micro-optical arrays.
Tucson, 21 Nov 2002 Optical Sciences Colloquium 26
Relationship between λ and Lens Spacing
n Ai
ii
22
2 21
3
1= +−=
∑ λλ λ
Z zR r n n z
n z− =
− + + − ′LNM OQP− ′
b g c hc h
1 1 1
1
2 2
2
dn Z z Z z R r
n=
− − − + −−
( ) b g b g2 2
1
Solve for d so that rays conserve energy as they leave second lens:
From the Optical Design:
Tucson, 21 Nov 2002 Optical Sciences Colloquium 27
J.A. Hoffnagle & C. M. Jefferson, “Design and performance of a refractive optical system that converts a Gaussian to a flattop beam,” Appl. Opt. 39.30, 5488-5499, 2000.
Tucson, 21 Nov 2002 Optical Sciences Colloquium 28
Newport - Refractive Beam Shaper*
*Based on New Product Concept literature distributed at SPIE 2002, Seattle.
Tucson, 21 Nov 2002 Optical Sciences Colloquium 29
Gaussian to Flat Top
• High Efficiency – Accepts 99.7% of the input beamwhile minimizing diffraction by using a Fermi-Diracoutput beam profile
•High Uniformity - 78% incident power is within region with 5% rms power variation
Tucson, 21 Nov 2002 Optical Sciences Colloquium 30
Collimated Output Beam
Tucson, 21 Nov 2002 Optical Sciences Colloquium 31
Large Bandwidth – 257 to 1550nm
Tucson, 21 Nov 2002 Optical Sciences Colloquium 32
Non-Rotationally Symmetric SystemCornwell, “Non-projective transformations in optics,” Ph.D. Dissertation,University of Miami, Coral Gables, 1980 and Proc. SPIE 294, 62-72, 1981.
• Differential Power
• Conservation of Energy: Ein=Eout
• Magnifications of ray coordinates
• OPL condition• Determine sag z(r) of
first surface• Determine inverse
magnification• Determine sag Z(R) of
second surface
( , ) ( , )in outI x y dxdy I X Y dXdY=
( )( )( )1 2
0
1( )x
xx
X x
a u dum x C C
x A um u
= +
∫
Tucson, 21 Nov 2002 Optical Sciences Colloquium 33
Laser Beam Shaping System for Cymer ELS-5000A KrF Excimer Laser
See http://www.cymer.com
Tucson, 21 Nov 2002 Optical Sciences Colloquium 34
Two Mirror Beam Shaping SystemShealy & Chao, Proc SPIE 4443-03, 2001
Input beam has 1-to-3 beam waist in x-to-y directions:2 2
0 0
( , ) exp 2 exp 2inx yI x yx y
= − −
0 0
const.out X YI A A= =
Tucson, 21 Nov 2002 Optical Sciences Colloquium 35
Sag of First Mirror
2 20
10; 5L h
l L h
= =
= +
00 0 max 0
00 max 0
max 0 max
1; ;2
3 ; 32
2
rr x x r
ry y r
X r Y
= = =
= =
= =
Parameters:
Tucson, 21 Nov 2002 Optical Sciences Colloquium 36
Optical Performance Analysis*
• ZEMAX was used.
• Elliptical Gaussian input beam profile was modeled as user-defined surface.
• Two mirror surfaces were also modeled as user-defined surfaces.
*Shealy and Chao, Proc. SPIE 4443, 24-35, 2001: “Design and Analysis of an elliptical Gaussian laser beam shaping system.”
Tucson, 21 Nov 2002 Optical Sciences Colloquium 37
Relative IlluminationInput Beam
Output Beam
Tucson, 21 Nov 2002 Optical Sciences Colloquium 38
First Mirror Surface Analysis
Tucson, 21 Nov 2002 Optical Sciences Colloquium 39
Second Mirror Surface Analysis
Tucson, 21 Nov 2002 Optical Sciences Colloquium 40
Tolerance Analysis• In A, the first mirror was decentered 10% of its diameter about x-axis.• In B, both mirrors were decentered by 2.5% of their diameter about x- and y-axes and tilted about the three axes by 0.25 degrees.
Tucson, 21 Nov 2002 Optical Sciences Colloquium 41
Conclusions for 2 Mirror System
• Designed a two-mirror system with no central obscuration for shaping a 3:1 elliptical Gaussian beam into a uniform output beam.
• ZEMAX used to do optical performance analysis: – First mirror has strong aspherical component along
direction of smaller waist (120µm for 6mm diameter mirror).
– Output beam profile is stable for decentering of less than 2.5% of mirror diameter and 0.25 degrees about coordinate axis.
Tucson, 21 Nov 2002 Optical Sciences Colloquium 42
Optical Design of Laser Beam Shaping Systems: Solution of Differential Equations
versus Global Optimization
• Geometrical methods leads to equations of the optical surfaces:
• Global Optimization with discrete & continuous variables:– Beam shaping merit function
Tucson, 21 Nov 2002 Optical Sciences Colloquium 43
Genetic Algorithms (GAs)• Useful Tool in Geometrical Optics?• Advantages
– Ease of implementation and broad applicability– Relative immunity to local extrema– Easily made parallel
• Drawbacks– Random starting designs– “This planet does not lack for life forms, but
there is a paucity of intelligent ones.2”2. Shafer,192.
Tucson, 21 Nov 2002 Optical Sciences Colloquium 44
GA Concepts
• Generating solutions• Populations and
individuals• Parents and children:
producing new populations
Initialize GA byrandomly pickingnew individuals
Evaluate MeritFunction for eachindividual ingeneration
Perform genetic operations(reproduction, mutations,cross-overs); produce newgeneration
Is the populationstagnant? (Micro-GAcheck)
Keep best individual andreplace the remainder withrandomly-selected individuals
Terminationcriterion reached?
End
Y
N
Y
N
Step eligible for parallelization
Tucson, 21 Nov 2002 Optical Sciences Colloquium 45
GA Concepts
• Biological Paradigm and Nomenclature• Expressing solutions in terms of binary
strings: genetic code
Tucson, 21 Nov 2002 Optical Sciences Colloquium 46
Irradiance Profile Calculations
• A fast, efficient method is needed to calculate the irradiance profile on a specified Output Surface
• The Geometrical Optics form of the Energy Conservation Law is harnessed for these calculations:
( )2 2 20 ( ) 0n k e∇ + =r
0 0( ) ( ) exp ( )e e ik S = r r r
( )2 2S n∇ = 2 20 0 02 0e S e e S∇ ⋅∇ + ∇ =( )f f f∇⋅ = ∇⋅ + ⋅ ∇v v v( ) 0I∇⋅ =a
1 1 2 2I dA I dA=
Source
1 1I dA
2 2I dA
Tucson, 21 Nov 2002 Optical Sciences Colloquium 47
( ) ( )ˆ ˆ( ) ( ) ( ) ( ) ( ) ( ) ,in in out out
I O
E da u dAσ ρ ρ ρ= ⋅ = Ρ Ρ ⋅ Ρ∫ ∫n v n v
( ) ( )11
cos( ) cos( )( ) .
cos( ) ( )
in outi i i ii
i i outi i i i
iu
i
ρ ρ ρ χσ ρ −
−
− Ρ = Ρ Ρ −Ρ 1 1 2 2I dA I dA=
Tucson, 21 Nov 2002 Optical Sciences Colloquium 48
Merit Function Topography for Beam Shaper/Projector
ΡN
µ
M
2
1
1 { ( ) }N
ii
u uN
µ=
= Ρ −∑
21 exp 0.01{50 } ,NMµ
= − − Ρ
uN
u ii
N
==∑1
1
( ).Ρ
Tucson, 21 Nov 2002 Optical Sciences Colloquium 49
Zoomed Area (above)
Thin Lens Element Shaping
Element
Output SurfaceInput Plane
One Lens Beam Shaping SystemEvans & Shealy in Applied Optics vol. 37, 5216-5221, 1998
Tucson, 21 Nov 2002 Optical Sciences Colloquium 50
Beam Profile on Input Plane
( )2( ) expi iσ ρ αρ= −
( )σ ρ
,mmρ
Tucson, 21 Nov 2002 Optical Sciences Colloquium 51
Beam Profile on Output Surface
( )u Ρ
,mmΡ
( ) ( )11
cos( ) cos( )( ) .
cos( ) ( )
in outi i i ii
i i outi i i i
iu
i
ρ ρ ρ χσ ρ −
−
− Ρ = Ρ Ρ −Ρ
Tucson, 21 Nov 2002 Optical Sciences Colloquium 52
Results for GA-optimized Beam Shaper/Projector System
• CODE V used to evaluate merit function• Simultaneous execution on 4 Sun Sparcs• Manually Tweaking the Merit Function
Lanscape• Total search time of 7 hours• “Best” solution found
Tucson, 21 Nov 2002 Optical Sciences Colloquium 53
Genetic Algorithm Optimization MethodN. C. Evans, D. L. Shealy, Proc. SPIE 4095, pp. 27-39, 2000.
• Can a spherical-surface GRIN beam shaping system be designed using catalog GRIN materials?
• Problem is well suited for Genetic Algorithms:– discrete parameters
• Number of lens elements • GRIN catalog number
– Continuous parameters: radii, thickness
Tucson, 21 Nov 2002 Optical Sciences Colloquium 54
Gradient-Index (GRIN) Shaper Problem*
21 1 1 1n a b z c z= + + 2
2 2 2 2n a b z c z= + +
*C. Wang and Shealy, “Design of gradient-index lens system for laser beam shaping,” Applied Optics 32, 4763-4769, 1993.
Tucson, 21 Nov 2002 Optical Sciences Colloquium 55
Beam Shaping Merit Function Used in GA Optimization
( )
( )
22
Target N1Diameter Collimation
Uniformityout out
1 1
exp exp 1 cos ( )
1 1( )
NQ
ii
N N
i ki k
s R RM MM
MI R I R
N N
γ=
= =
− − − − = =
−
∏
∑ ∑
Rtarget = Output Beam RadiusRN = Marginal Ray Height on Output Planeγi = Angle ith Ray Make with the Optical AxisQ and s = Convergence Constants
Tucson, 21 Nov 2002 Optical Sciences Colloquium 56
GA Solution to GRIN:Part 1
Lens 2: LightPath G1SF, negative gradient
Lens 1: LightPath G1SF, positive gradient
Connector
Tucson, 21 Nov 2002 Optical Sciences Colloquium 57
Parameters Optimized for Free-form GA-designed GRIN ProblemParameter Description Type Limits[i]
1 Number of Elements Discrete 1-4 (integer)2 Radius of curvature of left surface of Element 1 Continuous -100 to 100 3 Radius of curvature of right surface of Element 1 Continuous -100 to 1004 Thickness of Element 1 Continuous 1 to 10 5 Distance between Element 1 and Element 2 Continuous 1 to 10 6 GRIN glass type for Element 1 Discrete 1-6 (integer)7 Positive or Negative GRIN for Element 1 Discrete 0 or 18 Radius of curvature of left surface of Element 2 Continuous -100 to 100 9 Radius of curvature of right surface of Element 2 Continuous -100 to 100 10 Thickness of Element 2 Continuous 1 to 10 11 Distance between Element 2 and Element 3 Continuous 1 to 10 12 GRIN glass type for Element 2 Discrete 1-6 (integer)13 Positive or Negative GRIN for Element 2 Discrete 0 or 114 Radius of curvature of left surface of Element 3 Continuous -100 to 100 15 Radius of curvature of right surface of Element 3 Continuous -100 to 100 16 Thickness of Element 3 Continuous 1 to 10 17 Distance between Element 3 and Element 4 Continuous 1 to 10 18 GRIN glass type for Element 3 Discrete 1-6 (integer)19 Positive or Negative GRIN for Element 3 Discrete 0 or 120 Radius of curvature of left surface of Element 4 Continuous -100 to 100 21 Radius of curvature of right surface of Element 4 Continuous -100 to 100 22 Thickness of Element 4 Continuous 1 to 10 23 Distance between Element 4 and Surface 10 (a dummy surface) Continuous 1 to 10 24 GRIN glass type for Element 4 Discrete 1-6 (integer)25 Positive or Negative GRIN for Element 4 Discrete 0 or 126 Distance from Surface 10 (a dummy surface) to the Output Plane Continuous 1 to 100
Tucson, 21 Nov 2002 Optical Sciences Colloquium 58
Determining when a Solution is Found
Tucson, 21 Nov 2002 Optical Sciences Colloquium 59
3-Element GRIN Shaping System
Element 1
Element 2Element 3
Tucson, 21 Nov 2002 Optical Sciences Colloquium 60
3-Element GRIN Shaping System•Average evaluation time for a generation: 7.80s
•Total execution time: 26.8 hrs
•Integrating Output Profile over Output Surface yields 21.9 units; integrating Input Profile over Input Surface yields 21.7 units
Tucson, 21 Nov 2002 Optical Sciences Colloquium 61
Summary and Conclusions• Geometrical methods for design of laser beam
shaping systems uses:– Conservation of energy within a bundle of rays,– Constant optical path length condition.
• Numerical and analytical techniques have been used to design a 1 and 2-element beam shaping systems.
• Laser beam shaping merit function used with genetic algorithms to design a 3-element GRIN system with spherical surface lenses.
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