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Chapter 4
Efficiency of a Displacement
Process
EOR-Chapter 4 2
Efficiency of a Displacement Process
Introduction Microscopic Displacement of Fluid in a
Reservoir Macroscopic Displacement of Fluids in a
Reservoir
EOR-Chapter 2 3
Efficiency of a Displacement Process
Trapped Oil
ME
= = (Microscopic Efficiency)(Microscopic Efficiency) × × (Volumetric Efficiency)(Volumetric Efficiency)
ProductionProduction
InjectionInjection
E ME VE
EOR-Chapter 2 4
Overall Displacement Efficiency
DV EEE *Where;
E =overall hydrocarbon displacement efficiency ,the volume of hydrocarbon displaced divided by the volume of hydrocarbon in place at the start of the process measured at the same conditions of pressure and temperature
DEVE =Macroscopic (Volumetric) displacement efficiency
=Microscopic (Volumetric) hydrocarbon displacement efficiency.
EOR-Chapter 2 5
Microscopic & Macroscopic sweep efficiencies
agentEORbycontactedoilofvolumereservoir
agentEORbymobilizedoilofvolumereservoirED
placeinoriginallyoilofvolumereservoir
agentdisplacingbycontactedoilofvolumereservoirEv
EOR-Chapter 2 6
Efficiency of a Displacement Process
Macroscopic Displacement
E
DV EEE Where; Where; = Overall displacement efficiency= Overall displacement efficiency
VE == Macroscopic displacement efficiencyMacroscopic displacement efficiency
= Microscopic displacement efficiency= Microscopic displacement efficiencyDE
EOR-Chapter 2 7
However,
LE
LAV EEE
== Areal Sweep efficiencyAreal Sweep efficiency
= = Lateral Sweep efficiencyLateral Sweep efficiency
AE
Efficiency of a Displacement Process
EOR-Chapter 2 8
Therefore, using all these definitions, the oil recovery equation is
To use this equation we must have methods to evaluate the different efficiencies.Estimates are available from:
Correlations
Scaled laboratory experiments Numerical simulation
)(***O
PoiLADP B
VSEEEN
Oil Recovery Equation
EOR-Chapter 2 9
Oil Recovery Equation
RE
placeinnhydrocarboofVolume
displacednhydrocarboofVolumeER
and is the volumetric sweep efficiency defined as
typical values of the overall recovery efficiency are:
Steam injection 30%-50%Polymer injection 30%-55%CO2 injection 30%-65%Solvent injection 35%-63%
RE
RERE
RE
EOR-Chapter 2 10
Action on Sweep Efficiency at the
Macroscopic Scale
By increasing water viscosity
Polymer flooding
By decreasing the oil viscosity
Steam drive
In-situ combustion
Carbon dioxide drive
Action on Displacement Efficiency at the Pore
Scale
Miscible hydrocarbon gas flooding
Surfactant flooding
By using a miscible displacing fluid
By reducing the interfacial tension
By action on the rock wettability
Alkaline flooding
Action on Sweep & Displacement Efficiency
EOR-Chapter 2 11
Microscopic efficiency largely determines the success or failure of any EOR process. For crude oil it is reflected in the magnitude of Sor ( i.e., the residual oil saturation remaining in the reservoir rock at the end of the process).
Microscopic Displacement of Fluids
EOR-Chapter 2 12
This efficiency is measured directly from a coreflood (since =1). It can also be evaluated from the Buckley-Leveret (or fractional flow theory). For an immiscible displacement is bounded by a residual phase saturation of the displaced phase Sor. Miscible displacements eliminate - in principle -
orS
oilcontactedofVolume
mobilizedoilofVolumeED
VE
DE
Displacement Sweep Efficiency
EOR-Chapter 2 13
Example
Initial oil saturation, Soi, is 0.60 and Sor in the swept region for a typical water flood is 0.30
ED = (Soi – Sor) / Soi
ED= ( 0.60 – 0.30 ) / 0.60
ED=0.50
A typical waterflood sweep efficiency, Ev, at the economic limit is 0.70. Therefore,
E =EDEV = 0.50 X 0.70 = 0.35
EOR-Chapter 2 14
Important factors relating to microscopic displacement behavior
Capillary Forces
Surface Tension and IFT Solid Wettability Capillary Pressure
Viscous Forces
EOR-Chapter 2 15
Important factors relating to microscopic displacement behavior
Capillary forces have a detrimental effect, being responsible for the trapping of oil within the pore.
Trapping is a function of the ratio of Viscous to Capillary forces.
The residual oil saturation decreases as the ratio (Viscous force/ Capillary force) increases.
EOR-Chapter 2 16
Capillary Forces: Surface Tension and IFT
Whenever immiscible phases coexist in a porous as in essentially all processes of interest, surface energy related to the fluid interfaces influences the saturations, distributions and displacement of the phases.
Sand Grain
Oil
Connate Water
Close up of oil water between grains of rock
EOR-Chapter 2 17
Capillary Forces: Surface Tension and IFT
The surface force, which is a tensile force, is quantified in terms of surface tension
LLiquid
Air or Vapor
The force per unit length required to create additional surface area is the surface tension, usually expressed in dynes/cm.
EOR-Chapter 2 18
Capillary Forces: Surface Tension and IFT
The term “surface tension” usually is reserved for the specific case in which the surface is between a liquid and its vapor or air. If the surface is between two different liquids, or between liquid and solid, the term “interfacial tension” is used.
The surface tension of water in contact with its vapor at room temperature is about 73 dynes/cm.
IFT’s between water and pure hydrocarbons are about 30 to 50 dynes/cm at room temperature.
EOR-Chapter 2 19
Capillary Forces: Surface Tension and IFT
One of the simplest ways to measure the surface tension of liquid is to use a capillary tube.
At the static condition the force owing to surface tension will be balanced by the force of gravity acting on the column of fluid.
cos2
)( grh ow
EOR-Chapter 2 20
Capillary Forces- Solid Wettability
Fluid distribution in porous media are affected not only by the forces at fluid/fluid interfaces, but also by force of fluid/solid interfaces.
Wettability is the tendency of one fluid to spread on or adhere to a solid surface in the presence of a second fluid.
When two immiscible phases are placed in contact with a solid surface, one phase is usually attracted to the solid more strongly than the other phases. The more strongly attracted phase is called the wetting phase.
EOR-Chapter 2 21
Capillary Forces- Solid Wettability
Rock wettability affects the nature of fluid saturations and the general relative permeability characteristics of a fluid/rock system.
The following figure shows residual oil saturations in a strongly water-wet and a strongly oil-wet rock.
Water-wet System Oil-wet System
EOR-Chapter 2 22
Capillary Forces- Solid Wettability
Wettability can be quantitatively treated by examining the interfacial forces that exist when two immiscible fluid phases are in contact with a solid.
cos owwsos
os
ow
Water
ws
EOR-Chapter 2 23
Wettability
Where , , = IFT’s between water and oil, oil and solid, and water and solid respectively, dynes/cm.
, contact angle, measured through the water
os wsow
cos owwsos
EOR-Chapter 2 24
Capillary Forces- Capillary Pressure
A pressure difference exists across the interface. This pressure, called Capillary pressure can be illustrated by fluid rise in capillary tube.
The figure shows rise in a glass capillary. The fluid above the water is an oil, and because the water preferentially wets the glass of the capillary, there is a capillary rise.
EOR-Chapter 2 25
Capillary Pressure Equation
The difference pressure between oil water at the oil/water interface
rPor
rp
pghpp
owc
cow
cowwo
cos2cos2
)(
EOR-Chapter 2 26
Capillary Forces- Capillary Pressure
Capillary pressure is related to the fluid/ fluid IFT Relative permeability of fluids (through ) Size of capillary (through r) The phase with the lower pressure will always be the phase that
preferentially wets the capillary. Pc varies inversely as a function of the capillary radius and
increases as the affinity of the wetting phase for the rock surface increases.
EOR-Chapter 2 27
Viscous Force
Viscose forces in a porous medium are reflected in the magnetude of the pressure drop that occurs as a result of fluid flow through porous medium.
One of the simplest approximations used to calculate the viscous force is to consider a porous medium as a bundle of parallel capillary tubes.
With this assumption, the pressure drop for laminar flow through a single tube is given by Poiseuille’s law.
EOR-Chapter 2 28
Viscous Force
Capillary Number
Water floods typically operates at conditions where Nca < 10-6, and Nca values on the order of 10-7 are probably most common.
ow
wcaN
EOR-Chapter 2 29
Displacement Sweep Efficiency is a function of Mobility ratios Throughput or Transmissibility Wettability Dip angle Capillary number
EOR-Chapter 2 30
All sweep efficiencies can be increased by decreasing the mobility ratio by either:
rwOil kor i.e. steam flooding
rowater kor
Oil recovery would still be limited by the residual or trapped oil saturation. Methods that target to reduce this saturation include solvent flooding.
Increasing i.e. polymer flooding
Lowering
Displacement Sweep Efficiency
EOR-Chapter 2 31
Experimental evidence suggests that under most conditions the residual oil saturation(usually a non-wetting phase) can be as large as the wetting phase saturation.The relationship between trapping wetting or non-wetting phase and a local capillarynumber indicates experimental evidence of trapping in a permeable media. Thisrelationship is called the capillary desaturation curve.The local capillary number is
u
NC Where
= interfacial tension between displacing and displaced fuid
u = displacing superficial velocity
=displacing fluid viscosity
Trapped Oil Saturation
EOR-Chapter 2 32 Typical capillary desaturation curve
Trapped Oil Saturation
EOR-Chapter 2 33
Note that it is required a substantial increase in the capillary number to reduce the residual oil saturation. The capillary number can be increased by either.
Lowering interfacial tension miscible/solvent methodsIncreasing viscosity of displacing fluid polymer flooding.
There are physical, technical and economic limits of how much can the displacing fluid viscosity and velocity be increased, thus solvent methods are the natural choice to increase the capillary number and therefore lower the residual oil saturation
Capillary desaturation curves are also affected by wettability, and pore size distribution.
Trapped Oil Saturation
EOR-Chapter 2 34
Viscous Force
Viscous forces in a porous medium can be expressed in terms of Darcy’s law:
darciestypermeabilik
porosity
ftlengthL
cpityvis
Dftvelocityaverage
psioppressuredrpk
Lp
,
,
,cos
/,
,
))(158.0(
EOR-Chapter 2 35
Calculation of pressure gradient for viscous oil flow in a rock
BAowBA rr
pp11
cos2
EOR-Chapter 2 36
Example: Calculation of pressure gradient for viscous oil flow in a rock
Calculate the pressure gradient for flow of an oil with 10 cp viscosity at an interstitial flow rate of 1 ft/D. the rock permeability is 250 md and the porosity is 0.2.
Solution: ))(158.0(k
Lp
ftpsidarcies
cpDft
L
p/264.1
250.0
2.010/0.1158.0
EOR-Chapter 2 37
Example: pressure required to force an oil trap through a pore throat
Calculate the threshold pressure necessary to force an oil trap through a pore throat that has a forward radius of 6.2 micro meter and radius of 15 micro meter. Assume that the wetting contact angle is zero and IFT is 25 dynes/sec.
PB-PA=2*25(1/0.00062-1/0.0015)= - 47300 dynes/cm2 -47300*1.438*10^-5= - 0.68 psi
ftpsift
cm
cm
psiLp /2073
48.30
01.0
68.0/
EOR-Chapter 2 38
Macroscopic Displacement of Fluids in Reservoir
Volumetric Displacement Efficiency & Material Balance
Volumetric Displacement Efficiency Expression Definition & Discussion of Mobility Ratio Areal Displacement Efficiency Correlations Vertical Displacement Efficiency Volumetric Displacement Efficiency
EOR-Chapter 2 39
Macroscopic Displacement of Fluids In a Reservoir
Introduction
Oil recovery in any displacement process depends on the volume of reservoir contacted by the injected fluid. A quantitative measure of this contact is the volumetric displacement (sweep) efficiency defined as the fraction of reservoir (or project )PV that has been contacted or affected by the injected fluid. Clearly, is a function of time in a displacement process.
Overall displacement efficiency in a process can be viewed conceptually as a product of the volumetric sweep, ,and the microscopic efficiency,
VE
VE DE
EOR-Chapter 2 40
Volumetric Displacement Efficiency and Material Balance
Volumetric displacement ,or sweep efficiency, is often used to estimate oil recovery by use of material-balance concepts. for example, consider a displacement process that reduces the initial oil saturation to a residual saturation in the region contacted by the displacing fluid. If the process is assumed to be piston-like, the oil displaced is given by
Vpo
o
o
op EV
B
S
B
SN )(
2
2
1
1
Where ;
= oil displaced , = oil saturation at the beginning of the displacement process, = residual oil saturation at the end of the process in the volume of reservoir contacted by the displacing fluid, = FVF at initial conditions, = FVF at the end of the process, and = reservoir PV
2oB1oB
2oS1oSpN
pV
EOR-Chapter 2 41
Volumetric Displacement Efficiency and Material Balance
VDp EE
N
NRF
1
1N
Where;
=OOIP at the beginning of the displacement process. if displacement performance data are available, above Eq. also can be used to estimate volumetric sweep. For example, if waterflood recovery data are available, the equation can be rearranged to solve for
)(2
2
1
1
o
o
o
op
pV
BS
BS
V
NE
EOR-Chapter 2 42
Volumetric Displacement Efficiency and Material Balance
Where = oil produced in the waterflood.
)(2
2
1
1
o
o
o
op
pV
BS
BS
V
NE
pN
EOR-Chapter 2 43
Volumetric Displacement Efficiency
Volumetric Displacement Efficiency Expressed as the product of Areal and Vertical Displacement Efficiencies
Volumetric sweep efficiency can be considered conceptually as the product of the areal and vertical sweep efficiencies. Consider a reservoir that has uniform porosity,thickness,and hydrocarbon saturation, but that consists of several layers. For a displacement process conducted in the reservoir, can be expressed as
LAV EEE *
VE
EOR-Chapter 2 44
Where ; All efficiencies are expressed as fractions. is the volumetric sweep efficiency of the region confined by the largest areal sweep efficiency in the system.
For a real reservoir, in which porosity,thickness,and hydrocarbon saturation vary areally, is replaced by a pattern sweep efficiency ,
LPV EEE AE
AE
areaTotal
agentdisplacingbycontactedAreaEA
Volumetric Displacement Efficiency
lengthverticalTotal
agentdisplacingbycontactedLengthEL
EOR-Chapter 2 45
Where ; =pattern sweep (displacment)efficiency,hydrocarbon pore space enclosed behind the injected-fluid front divided by total hydrocarbon pore space in the pattern or reservoir a real reservoir.In essence, is an ideal sweep efficiency that has been corrected for variations in thickness,porosity,and saturation. In either case, overall hydrocarbon recovery efficiency in a displacement process may be expressed as
DLP EEEE
pE
pE
LPV EEE
Volumetric Displacement Efficiency
EOR-Chapter 2 46
This figure illustrates the concept of the vertical and areal sweep efficiency
EOR-Chapter 2 47
The following figure illustrate the definition of areal sweep efficiency
areaTotal
agentdisplacingbycontractedArealEA
EOR-Chapter 2 48
These correlations are for piston like displacements in homogeneous, confined patterns. When the well patterns are unconfined, the total area can be much lager and smaller .
Areal Sweep EfficiencyThe most common source of areal sweep efficiency data is from displacements in scaled physical models. Several correlations exist in the literature. Craig (1980) in his SPE monograph “the reservoir engineering aspects of waterflooding” discusses several of these methods.
AE
Oil Recovery Equation
EOR-Chapter 2 49
AREAL SWEEP EFFICIENCY
When oil is produced from patterns of injectors and producers, the flow is such that only part of the area is swept at breakthrough. the expansion of the water bank is initially radial from the injector but eventually is focused at the producer.
The pattern is illustrated for a direct line drive at a mobility ratio of unity.At breakthrough a considerable area of the reservoir is unswept.
EOR-Chapter 2 50
Parameters Affecting The following definitions are needed to describe the effects of
reservoir and fluid properties upon the efficiencies: Mobility Ratio Dimensionless Time Viscous Fingering Injection/Production well pattern Reservoir permeability heterogeneity Vertical Sweep Efficiency Gravity Effect Gravity/ Viscous Force Ratio
AE
EOR-Chapter 2 51
Mobility Definition
The mechanics of displacement of one fluid with another are controlled by differences in the ratio of effective permeability and viscosity
The specific discharge (flow per unit cross sectional area) for each fluid phase depends on This is called the fluid mobility( ):
k
k
EOR-Chapter 2 52
Mobility Control
d
W
WW
k
O
OO
k
Mobility controls the relative ease with which fluids can flow through a porous medium.
= mobility of the displacing fluid phase
= mobility of the displaced fluid phase
dM D /D
Mobility ratio
The mobility ratio is an extremly important parameter in any displacement process. It affects both areal and vertical sweep, with sweep decreasing as M increases for a given volume of fluid injected.
M <1 then favorable displacement M >1 then unfavorable displacement
EOR-Chapter 2 53
EOR-Chapter 2 54
volumeporefrence
fluidinjectedOfVolumeCumulativetD Re
Dimensionless Time
This variable is used to scale-up between the laboratory and the field . The dimensionless time is defined as the
There are various definitions for the reference pore volume according to the application.
EOR-Chapter 2 55
Viscous Fingering
The mechanics of displacing one fluid with another are relatively simple if the displaced fluid (oil) has a tendency to flow faster than the displacing fluid (water).
Under these circumstances, there is no tendency for the displaced fluid to be overtaken by the displacing fluid and the fluid – fluid (oil-water) interface is stable.
EOR-Chapter 2 56
Viscous Fingering
If the displacing fluid has a tendency to move faster than the displaced fluid, the fluid-fluid interface is unstable. tongues of displacing fluid propagate at the interface. This process is called viscous fingering.
EOR-Chapter 2 57
Viscous Fingering
- Decreases when the mobility ratio increases because the displacement front becomes unstable. This phenomena, known as viscous fingering results in an early breakthrough for the displacing fluid, or into a prolonged injection to achieve sweep-out. The next figure illustrates this phenomena, which is commonly observed in solvent flooding.
AE
EOR-Chapter 2 58
Flooding Patterns
EOR-Chapter 2 59
Flooding Patterns
EOR-Chapter 2 60
Flooding Patterns
EOR-Chapter 2 61
Permeability Heterogeneity
It is often has a marked effect on areal sweep. This effect may be quite different from reservoir to reservoir, however, and thus it is difficult to develop generalized correlations.
Anisotropy in permeability has great effect on the efficiency.
EOR-Chapter 2 62
Effect of Mobility Ratio
The following figures show fluid fronts at different points in a flood for different mobility ratios. These results are based on photographs taken during displacements of one colored liquid by second, miscible colored liquid in a scaled model.
EOR-Chapter 2 63
Correlations Based on Miscible Fluids, Five-Spot Pattern. Figure 1 shows fluid fronts at different points in a flood for different mobility Ratios. The Viscosity Ratio varied in different floods and, because only one phase was present, M is given by Equation.
D
dM
Correlations Based on ….
EOR-Chapter 2 64
Figure-1: Miscible displacement in a quarter of
a five-spot pattern at mobility ratios<=1.0
M=0.151 M=1.0
BreakthroughBreakthrough
Po
re V
olu
mes
Inje
cted
Po
re V
olu
mes
Inje
cted
Injection well
Producing well
EOR-Chapter 2 65
M=2.40
PV
BT BT
M=4.58
0.3
0.2
0.10.06
0.2
0.3
0.1
PV
• PRODUCING WELL PV=PORE VOLUME INJECTED
X INJECTION WELL BT=BREAKTHROUGH
Figure 2: Miscible displacement in a quarter of a five-spot pattern at mobility ratios>1.0,viscous fingering (from Habermann)
EOR-Chapter 2 66
M=17.3 M=71.5
BTBT
0.150.05
• PRODUCING WELL PV=PORE VOLUME INJECTED
X INJECTION WELL BT=BREAKTHROUGH
Figure-3: Miscible displacement in a quarter of a five-spot pattern at mobility ratios>1.0,viscous fingering (from Habermann)
EOR-Chapter 2 67
Habermann presented values of EA as a function of dimensionless PVs injected,Vi/Vp,after breakthrough, as shown in Figure 4 Results are given for M=0.216 (favorable) to 71.5 (unfavorable).
Correlations Based on Miscible Fluids, Other Patterns
Numerous modeling studies for patterns other than a five-spot have been reported. Craig gives a summery listing of references. As an example of such studies, Figure 5 shows one reported result of areal sweep as a function of mobility ratio for one-eighth of a nine-spot pattern.
Correlations Based on ….
EOR-Chapter 2 68
Pore Volume Injected, Vi/ Vp
Figure-4: Areal sweep efficiency after breakthrough as a function of mobility ratio and PVs injected
Are
al S
wee
p E
ffic
ien
cy,
EA
%
EOR-Chapter 2 69
Correlation Based on Miscible Fluids Numerous modeling studies for
patterns other than a five-spot have been reported.
One-eight of a nine-spot pattern is shown as an example.
This study was conducted with miscible liquids and the X-ray shadowgraph method
EOR-Chapter 2 70
Figure-5:Areal sweep efficiency as a function of mobility ratio;
EOR-Chapter 2 71
Correlations Based on Immiscible Fluids, Five –Spot Pattern
Craig et al. conducted an experimental study of areal displacement efficiency for immiscible fluids consisting of oil, gas, and water.The study was conducted in consolidated sandstone cores, and fronts were monitored with the X-ray shadowgraph technique.
Figure 6 compares areal sweep efficiency at breakthrough as a function of mobility ratio to the data of Dyes et al., which were obtained with miscible fluids.
EOR-Chapter 2 72
Figure-6: Areal sweep efficiency at breakthrough as a function of mobility ratio( immiscible fluid displacement);
Water-Gas
Miscible
Gas-Oil
Are
al S
wee
p E
ffici
ency
at B
reak
thro
ugh
,EA
bt%
Mobility Ratio,M
EOR-Chapter 2 73
Prediction of Areal Displacement Performance on the Basis of Modeling Studies
Prediction based on Piston-Like Displacement Caudle & Witte correlation Claridge correlation (viscous fingering) Mahaffey et. Al model (dispersion )
Parallel plate glass model
Mathematical Modeling-Numerical
EOR-Chapter 2 74
Prediction of Areal Displacement Performance on the Basis of Modeling Studies
Prediction Based on Piston –Like Displacement.
Caudle and Witte published results from laboratory models of a five-spot pattern in which displacements were conducted with miscible liquids.
The performance calculations are restricted to those floods in which piston-like displacement is a reasonable assumption; i.e., the displacing phase flows only in the swept region and the displaced phase flows in the upswept region. No production of displaced phase occurs from the region behind the front.
EOR-Chapter 2 75
Figure 8 gives EA as a function of M for different values of the fractional flow of the displacing phase ,fD, at the producing well.
)( oroipd SSAhV
Figure 7 through 9 show data from the experiments. In Figure 7, EA is given as a function of M for various values of injected PVs.
The ratio Vi/Vpd is a dimensionless injection volume defined as injected volume divided by displaceable PV, Vpd. For a waterflood, Vpd is given by
Prediction Based on Piston –Like Displacement
EOR-Chapter 2 76
Figure 9 presents the conductance ratio, , as a function of M for various values of EA, but only for values of M between 0.1 and 10. Conductance is defined as injection rate divided by the pressure drop across the pattern,
At any mobility ratio other than M=1.0,conductance will change as the displacement process proceeds. For a favorable mobility ratio, conductance will decrease as the area swept, EA, increases. The opposite will occur for unfavorable M values.
The conductance ratio, shown in Figure 9 is the conductance at any point of progress in the flood divided by the conductance at that same point for a displacement in which the mobility ratio is unity (referenced to the displaced phase).
p
q
Prediction Based on Piston –Like Displacement
EOR-Chapter 2 77
By combining Figures 7 through 9 , performance calculations can be performed. Areal sweep, as a function of volume injected, is available from Figure 7.
Fractional production of either phase can be determined with Figure 8.
Rate of injection may be determined as a function of EA from Figure 9.
To apply Figure 9, however , it is also necessary to use the appropriate expression for initial injection rate. This is given by Craig for a five-spot pattern using parameters for the displaced phase:
Prediction Based on Piston –Like Displacement
EOR-Chapter 2 78
Where i=injection rate at start of a displacement process, B/D; k=absolute rock permeability ,md;Krd=relative permeability of displaced phase, h=reservoir thickness ,ft; =pressure drop, psi; =viscosity of displaced phase, cp;d=distance measured between injection and production wells ,ft; and rw= wellbore radius, ft.
)2688.0(log
001538.0
wd
rd
r
dphkk
i
iq
At any point in the flood, the flow rate is given by
p
Prediction Based on Piston –Like Displacement
EOR-Chapter 2 79
Are
al S
wee
p E
ffic
ien
cy,E
A
Figure-7: Areal Sweep efficiency as a function of mobility ratio and injected volume.
EOR-Chapter 2 80
Mobility Ratio,M
Are
al S
wee
p E
ffic
ien
cy,E
A
Figure-8:Areal sweep efficiency as a function of mobility ratio and fractional flow at displacing phase
EOR-Chapter 2 81
Mobility Ratio,M
Co
nd
uct
ance
Rat
io,
Figure-9:Conductance ratio as a function of mobility ratio and areal sweep.
EOR-Chapter 2 82
Example: Performance Calculations Based on
Physical Modeling Results A waterflood is conducted in a five-spot pattern in which the pattern area is 20 acres. Reservoir properties are:
ftr
psip
Satk
ROSatk
mdk
STBRBB
cp
cp
S
S
fth
w
wiro
rw
o
w
o
or
oi
5.0
1250
)(94.0
)(27.0
50
/0.1
1
10
25.0
8.0
2.0
20
EOR-Chapter 2 83
Required
Use the method of Caudle and Witte to calculate: (1) the barrels of oil recovered at the point in time at which the producing WOR=20 , (2) the volume of water injected at the same point (3) the rate of water injection at the same point in
time (4) the initial rate of water injection at the start of
waterflood
EOR-Chapter 2 84
Solution Apply the correlations in Figs 7 through 9 1. Calculate oil recovered
M=2.9, fD=20/21=.95 From Fig 8, EA=.94 Np=321000 STB
2. Calculate total water injected. From Fig 7, Vi/Vpd=2.5 (at EA=.94) Vpd = Vp (Soi – Sor) = 341300 bbl Vi = Vpd x 2.5 = 853300 bbl
3. Calculate water injection rate at the same point in time. From
i=63.4 B/D From Fig. 9, γ=2.7, from = 63.4x2.7 = 171 B/D
4. Calculate initial water injection rate i=63.4 B/D
iq
)2688.0(log
001538.0
wd
rd
r
dphkk
i
EOR-Chapter 2 85
Calculation of EA with Mathematical Modeling
Models are based on Numerical analysis methods and digital computers Douglas et al-2D immiscible displacement.
This method is based on the numerical solution of the PDE’s that describe the flow of two immiscible phases in two dimensions
Higgins and Leighton mathematical model is based on frontal advance theory
EOR-Chapter 2 86
Comparison of calculated and experimental results, 5 spot pattern (Douglas et al.)
EOR-Chapter 2 87
Vertical sweep ( displacement) efficiency, pore space invaded by the injected fluid divided by the pore space enclosed in all layers behind the location of the leading edge (leading areal location) of the front.
Areal sweep efficiency, must be combined in an appropriate manner with vertical sweep to determine overall volumetric displacement efficiency. It is useful, however, to examine the factors that affect vertical sweep in the absence of areal displacement factors.
Vertical Displacement Efficiency
EOR-Chapter 2 88
Vertical Displacement Efficiency
EOR-Chapter 2 89
Vertical Displacement Efficiency
Vertical Displacement Efficiency is controlled primarily by four factors:
Heterogeneity Gravity effect
Gravity segregation caused by differences in density
Mobility ratio Vertical to horizontal permeability variation Capillary forces
EOR-Chapter 2 90
Observation of thre figure indicates a stratified reservoir with layers of different permeability. The displacement of the fluid is an idealized piston-flow type. Due to the permeability contrast the displacing fluid will break through earlier in the first layer, while the entire cross-section will achieve sweep-out at a later time, when layer #4 breaks through.
Heterogeneity
EOR-Chapter 2 91
Heterogeneity:Location of the water front at different Location
EOR-Chapter 2 92
Heterogeneity:Dykstra-Persons model
EOR-Chapter 2 93
Gravity Segregation in Horizontal Bed
Water tongue
Water
Gas umbrella
Gas
EOR-Chapter 2 94
Gravity is a factor that affects the vertical efficiency not only in heterogeneous reservoirs but in homogenous as well.
Gravity effects will be important when: (1) vertical communication is good. This is satisfied when is large. 2
1
)(k
k
H
LR v
L
(2) When gravity forces are strong compared to viscous forces. This is satisfied when the gravity number Ng is large.
u
gkN g
LR
Gravity Effect
EOR-Chapter 2 95
Where:
= relative mobility of displacing fluid
= density difference (displaced - displacing)
u = superficial velocity
Both numbers are dimensionless.
The following figures indicate gravity effects for two different situations
1- Density of displacing fluid lower that density of displaced fluidThe displacing fluid will tend to flow to the top of the reservoir and bypass the fluid in the lower region (tongue over).
Gravity Effect
EOR-Chapter 2 96
Tonguing will occur when M < 1 as long as and Ng are large. The effect of heterogeneity and gravity can be mitigated by a favorable mobility ratio.Gravity tonguing does not require a dipping reservoir (although dipping can be used as an advantage when gravity is important). Gravity tonguing is important in steam flooding applications.
Density of displacing fluid lower that density of displaced fluid
LR
Gravity Effect
EOR-Chapter 2 97
Density of displacing fluid higher than density of displaced fluid
Gravity Effect
EOR-Chapter 2 98
Gravity segregation occurs when the injected fluid is less dense than the displaced fluid, Figure10a.Gravity override is observed in steam displacement, in-situ combustion, CO2 flooding, and solvent flooding processes. Gravity segregation also occurs when the injected fluid is more dense than the displaced fluid, as Figure10b shows for a waterflood.
Gravity segregation leads to early breakthrough of the injected fluid and reduced vertical sweep efficiency.
Effect of Gravity Segregation and Mobility Ratio on Vertical Displacement Efficiency
EOR-Chapter 2 99
Gravity Segregation in displacement processes
dD
Figure-10: Gravity Segregation in displacement processes.
Gravity Override (a) Gravity Underride (b) dD
Displaced Phase
Displacing Phase
Displacing Phase
Displaced Phase
Displaced Phase
Displacing Phase
EOR-Chapter 2 100
Experimental Result Craig et al. studied vertical sweep efficiency by
conducting a set of scaled experiments in linear systems and five-spot models. Both consolidated & unconsolidated sands were used.
The linear models used were from 10 to 66 in. long with length/height ratios ranging from 4.1 to 66.
Experiments were conducted with miscible and immiscible liquids having mobility ratios from 0.057 to 200.
Immiscible water floods were conducted at M<1. Vertical sweep was determined at breakthrough by
material balance and visual observation of produced effluent
EOR-Chapter 2 101
Craig et al. Results Results of the linear displacements are shown in the next Figure,
where EI at breakthrough is given as a function of dimensionless group called a viscous/gravity ratio.
EOR-Chapter 2 102
Vertical sweep efficiency at breakthrough as a function of the ratios of viscous/gravity forces, Linear system (from Craig et al.)
EOR-Chapter 2 103
Example: Relative Importance of Gravity Segregation in a Displacement Process
A miscible displacement process will be used to displace oil from a linear reservoir having the following properties:
EOR-Chapter 2 104
Solution
EOR-Chapter 2 105
Mathematical Model Spivak used a 2D and 3D numerical model to study
gravity effects during water flooding and gas flooding
EOR-Chapter 2 106
Gravity Segregation in two-phase flow
EOR-Chapter 2 107
The correlations of Craig et al. and Spivak on gravity segregation
Gravity segregation increases with increasing horizontal and vertical permeability.
Gravity segregation increases with increasing density difference between the displacing and displaced fluids.
Gravity segregation increases with increasing mobility ratio Gravity segregation increases with increasing rate. This effect can be
reduced by viscous fingering Gravity segregation decreases with increasing level of viscosity for a
fixed viscosity ratio.
The correlations of Craig et al. and Spivak indicate the following effects of various parameters on gravity segregation, as summarized by Spivak
EOR-Chapter 2 108
Flow Regions in Miscible Displacement at Unfavorable Mobility Ratios
gVR /
gVR /
(A) REGIONS I AND II
Oil
SOLVENT
Flow experiments in a vertical cross section in horizontal porous media have shown that four flow regions, are possible when the mobility ratio is unfavorable.Region I occurs at very low values and is characterized by a
single gravity tongue, with the displacing liquid either underriding or overriding the displaced liquid. Vertical sweep is a strong function of .At larger values, in region II, a single gravity tongue still exists, but vertical sweep is relatively insensitive to the value of the viscous/gravity ratio.
gVR /
EOR-Chapter 2 109
Flow Regions in Miscible Displacement at Unfavorable Mobility Ratios
(B) REGION III (C) REGION IV
SOLVENTSOLVENT
OilOil
The transition to region III occurs at a particular critical value.In region III, viscous fingers are formed along the primary gravity tongue and appear as secondary fingers along the primary gravity tongue. Vertical sweep is improved by the formation of the viscous fingers in this region.In region IV ,flow is dominated by the viscous forces and by viscous fingering. A gravity tongue does not form because of the strong viscous fingering. The vertical sweep in this region is relatively insensitive to
gVR /
gVR /
EOR-Chapter 2 110
Flow Regimes in Miscible Displacement
EOR-Chapter 2 111
Volumetric Efficiency Methods of estimating volumetric displacement
efficiency in a 3D reservoir fall into two classifications.
Direct application of 3D models Physical mathematical
Layered reservoir model. The reservoir is divided into a number of no communicating
layers. Displacement performance is calculated in each layer with
correlations of 2D. Performance in individual layers are summed to obtain
volumetric efficiency
EOR-Chapter 2 112
Volumetric Displacement Efficiency
EOR-Chapter 2 113
Calculation of volumetric sweep with Numerical Simulators