Rheometry Part 2 Introduction to the Rheology of Complex Fluids Dr. Aldo Acevedo - ERC SOPS1.
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Transcript of Rheometry Part 2 Introduction to the Rheology of Complex Fluids Dr. Aldo Acevedo - ERC SOPS1.
Rheometry
Part 2
Introduction to the Rheology of Complex Fluids
Dr. Aldo Acevedo - ERC SOPS 1
Rheometry
Making measurements of rheological material functions
To measure a material function, an experiment must be designed to produce the kinematics pescribed in th edefinition of the material function, then measure the stress components needed and calculate the material function.
Dr. Aldo Acevedo - ERC SOPS 2
Viscometer vs Rheometer
Viscometer – measures viscosity
Rheometer – measures rheological properties
A rheometer is a viscometer, but a viscometer is not a rheometer.
Dr. Aldo Acevedo - ERC SOPS 3
Experimental Methods/ Instruments
Capillary viscometers Cup Glass Extrusion rheometers
Rotational rheometers Parallel plates (disks) Cone-and-plate Couette Brookfield viscometers
Falling ball viscometers Extensional rheometers …
Dr. Aldo Acevedo - ERC SOPS 4
Rotational Rheometry
Rotational instruments makes it possible:1. To create within the sample the homogeneous
regime of deformation with strictly controlled kinematic and dynamic characteristics
2. Maintain assigned regime of flow for unlimited period of time
Different regimes of deformation:1. Constant angular velocity/frequency (constant
shear rate)
2. Constant torque (constant stress)
Dr. Aldo Acevedo - ERC SOPS 5
Rotational Rheometry
Advantages:1. Small quantities of materials2. Smaller instrument sizes3. Preferred for samples which are sensitive to contractions and
expansions4. Longer residence times /testing times5. Multiple testing or complex testing protocols
Disadvantages:1. Lower maximum shear rates/stresses2. Lower shear rates (~10-3 s-1) limited by power drive and speed
control (reducing gears)3. High shear rates – heating of the sample (bad energy
dissipation), Weissenberg effect, flow instabilities 4. Wall slip and ruptures (detachment from wall)
Dr. Aldo Acevedo - ERC SOPS 6
Constant frequency of rotationTypical experimental results:
1. Low speed – monotonic dependence of T(t) until steady state flow is reached2. Increasing speed, during the transient stage, the shear stress maximum
(stress overshoot) appears.3. The stress overshoot becomes more pronounced, and although the steady
flwo is observed it is followed by a drop in torque (approach to unstable regime of deformation)
4. High speeds, steady flow is generally impossible.
A drop in torque is an indication of rupture in the sample or its detachment from the solid rotating or stationary surface.
Dr. Aldo Acevedo - ERC SOPS7
Constant torqueTypical experimental results:
1. Low torque – slow monotonic transition to the steady viscous flow2. Higher stresses - speed passes through a minimum and only then is steady
flow reached.3. At very high stresses – a steady flow is generally impossible due to a gradual
adhesive detachment of sample from the measuring surface or a cohesive rupture of sample.
Dr. Aldo Acevedo - ERC SOPS 8
Parallel Disks (Parallel Plates)
The upper plate is rotated at a constant angular velocity Ω, the velocity is:
zr
vv
0
0
0
01)(1
vz
vv
rr
rv
rzr
With this velocity field, and assuming incompressible flow, the continuity equation gives:
Dr. Aldo Acevedo - ERC SOPS 9
Parallel Disks (Parallel Plates)
Assuming simple shear flow in θ-direction with gradient in z-direction (i.e. the velocity profile is linear in z)
H
zrv
Hzrv
zv
rBzrAv
@
0@0
)()(
Tvv )(
The boundary conditions:
Solving:
The rate-of-deformation tensor is then:
Dr. Aldo Acevedo - ERC SOPS 10
Parallel Disks (Parallel Plates)
R
H
R
R
rRR
zrzr
T
z
vz
v
z
vz
v
r
v
r
vr
v
r
v
vv
00
00
000
00
0
00
)(
At the outer edge, we can write
The rate-of-deformation tensor is then:
H
r
Dr. Aldo Acevedo - ERC SOPS 11
Parallel Disks (Parallel Plates)
H
trtd
H
rtdtt
tt
00
)(),0(
Assuming all curvature effects are negligible and unidirectional flow, viscosity can be calculated from:
The strain also depends on radial position:
R
Rr
R
Rrz
H
R
21
0
21
0
21
Dr. Aldo Acevedo - ERC SOPS 12
Parallel Disks (Parallel Plates)
zrzzz
z
rr
0
0
00
From the equation of motion (i.e. Cauchy-Euler), and assuming pressure does not vary with θ, then:
The strain also depends on radial position:
)(
0),(
rC
z
zr
z
z
Unknown function
To measure shear stress, we must take measurements at specific values of r and evaluate viscosity at each position. 13
Parallel Disks (Parallel Plates)
)()(
)(
)2)()((
)lever_arm)(stress(
0
21
0
rr
r
rdrrT
dAT
z
R
Hzz
A
The viscosity at any value of r can be written as:
Although it is possible to measure stress, it is easier to measure the total torque required to turn the upper disk
drrTR
2
0
2
Rewritting in terms of viscosity, then:
Dr. Aldo Acevedo - ERC SOPS 14
Parallel Disks (Parallel Plates)
3
0
33
)()(2 RR
RR
R
R
dR
T
d
d
Now to eliminate the integral, we differentiate both sides by the shear rate at the rim and using Leibnitz rule:
Now we need an expression of viscosity in terms of torque:
First, lets change variable from r to shear rate
dR
TR
R0
332
0
Dr. Aldo Acevedo - ERC SOPS 15
Parallel Disks (Parallel Plates)
RRR d
RTdRT
ln
)2/ln(32)(
33
To measure viscosity at the rim shear rate:• data at a variety of rim shear rates (rotational speeds) must be taken• torque must be differentiated •A correction must be applied to each data pair
Rearranging:
Warning – Since the strain varies with radius, not all material elements experience the same strain. The torque however, is a quantity measured from contributions at all r. For materials that are strain sensitive this gives results that represent a blurring of the material properties exhibited at each radius.
Dr. Aldo Acevedo - ERC SOPS 16
Dr. Aldo Acevedo - ERC SOPS 17
Parallel Disks (Parallel Plates)
040
040
cos2)(
sin2)(
R
HT
R
HT
SAOS material functions for parallel disk apparatus
It is also popular for SAOS where the results are:
Dr. Aldo Acevedo - ERC SOPS 18
Cone and Plate
Eliminates the radial dependence of shear rate (and strain).
Homogeneous flows produced only in the limit of small angles.
The velocity is:
rv
v
0
0
21 )(
0
CrCv
v
Assuming that single shearflow takes place in the Φ-direction with gradient in the (-rθ)-direction):
Thus,
Dr. Aldo Acevedo - ERC SOPS 19
Cone and Plate
02/
2/0
rv
vThe boundary conditions:
Applying BCs:
20
rv
The rate-of-deformation tensor:
The small cone angle.
zr
r
v
rr
v
rr
v
r
r
v
rr
00
00
000
0sin
sin
sin
sin00
00
20
Cone and Plate
0
1
sin
sin
v
r
v
r
Since θ is close to π/2, sin θ ~1 and:
Thus,
0
The strain is then:
00
00
)(),0(
t
tdtdtttt
Dr. Aldo Acevedo - ERC SOPS 21
Cone and Plate
0
21
21
00 )(
1 v
r
The viscosity is thus:
Looking for an expression for the stress using torque:
))()((
)lever_arm)(stress(
2
0 0 2
rdrdrT
dAT
R
A
Since shear rate is constant through the flow domain, the viscosity and shear stress are constant, too.
Dr. Aldo Acevedo - ERC SOPS
22
Cone and Plate
30
0
21
2
3
R
T
Thus viscosity is:
In the limit of small angle, the cone-and-plate geometry produces constant shear rate, constant shear stress and homogeneous strain throughout the sample.
The uniformity of the flow is also an advantage with structure forming materials, such as liquid crystals, incompatible blends, and suspensions that are strain or rate sensitive.
Also, the first normal stress difference can be calculated from measurement of the axial thrust on the cone.
2
3
3
2
RT
Dr. Aldo Acevedo - ERC SOPS
23
Cone and Plate
atmPRrdrF 22
0 2
2
22
20
1
2
R
F
The total thrust on the upper plate:
First Normal-stress coefficient in cone-and-plate
0300
0300
0
2
cos3
2
sin3
R
T
R
T
eR ti
SAOS for cone-and-plate
Dr. Aldo Acevedo - ERC SOPS 24
Couette (Cup-and-Bob)
zr
vv
0
0
1
1
)(
k
k
k
Rrkv
The velocity field is:
The velocity:
Shear rate:
r
r
k
k
r
v
0
21
0
21
1
Dr. Aldo Acevedo - ERC SOPS 25
Couette (Cup-and-Bob)
)2)()((
)area)(lever_arm)(stress(
kRLkRT
T
kRrr
322
)1(
LkR
kT
Torque:
Viscosity in Couette flow(bob turning):
Advantages: •Large contact area boosts the torque signal.
Disadvantages:•Limited to modest rotational speeds due to instabilities due to inertia or elasticity.
Dr. Aldo Acevedo - ERC SOPS 26
Commercial Rotational Rheometers
The biggest players: TA Instruments (originally Rheometrics
Scientific) Bohlin Paar Physica Haake (now part of Thermo Fisher) Reologica
Dr. Aldo Acevedo - ERC SOPS 27
The toppings…
Many other attachments or options may be used in rotational rheometers. These provide additional tests or independent measurements of data on the structure of fluids.
Magnetorheological cells Electrorheological cells Optical Attachments UV- and Photo- Curing accessories Dielectric Analysis
Dr. Aldo Acevedo - ERC SOPS 28
Capillary Flow
The velocity is:
123
20
0
0
x
v
r
v
r
v zz
Rrrz
0
21
Assuming cylindrical coordinates:
The flow is unidirectional in which cylindrical surfaces slide past each other.
Near the walls, except in the θ-direction, this flow is simple shear flow.
Dr. Aldo Acevedo - ERC SOPS 29
Capillary Flow
Rrz rv
RRr
z
r
vR
)(
zr
z
z
T
r
v
r
v
vv
00
000
00
)(
Thus, is the shear at the wall
The rate-of-deformation tensor is then:
r
vz
Dr. Aldo Acevedo - ERC SOPS 30
Capillary Flow
The viscosity for capillary flow is then:
R
Rrrz
Rr
z
Rrrz
rv
0
21
Now expressions for both the shear rate and stress in terms of experimental variables must be obtained.
The flow is assumed to be unidirectional and the fluid incompressible, thus, the continuity equation gives:
0
z
vv z
Dr. Aldo Acevedo - ERC SOPS 31
Capillary Flow
01 22
rrrr
Assumption:• stresses and pressure are independent of θ-direction• the flow field does not vary with z (fully developed flow)• capillary is long, such that end effects are diminished• stress tensor is symmetric
•Thus, the θ-component of the equation of motion gives:
The equations of motion:
gzP
-
P
P0
Dr. Aldo Acevedo - ERC SOPS 32
Capillary Flow - Stress
21
r
Cr
Using the mathematical boundary condition that the stress is finite at the center (r=0). Thus, it equals zero.
The z-component:
The r-component:
Solving:
rr
rrr
rrrrz
zr
rr
rz
)(1
)(1),(
P
P
Dr. Aldo Acevedo - ERC SOPS 33
Capillary Flow - Stress
0r
P
N2 is very small (negative) for polymers.
Less is known about tθθ. Thus, it seems reasonable to assume that this stress will be small or zero in a flow with assumed θ-symmetry.
Thus, the condition that both must be zero should be met easily by most materials.
Using the r-component and expressing it in terms of the normal stress coefficients:
rr
N
r
N
r
rrrrrrrr
22P
P
Dr. Aldo Acevedo - ERC SOPS 34
Capillary Flow- Stress
R
rr
L
PPR
Lrz
20
Again, taking the stress as finite in the center, the integration constant must be zero.
Rearranging the z-component
Solving:
r
Cr
L
PP
rrrrz
z
Lrz
rz
10
2
)(1)(
P
Shear stress in capillary flow
Dr. Aldo Acevedo - ERC SOPS 35
Capillary Flow – Shear Rate
Ra
La L
RPP
R
Q
1
2
)(14 03
For Newtonian fluid, calculate the expression for the velocity directly:
The viscosity is then:
Q
R
L
RPP
R
QR
r
R
Q
dr
dv
R
r
R
Qrv
L
R
R
R
z
z
42
)(
4
4
12
)(
30
0
21
3
3
2
2
Not so easily done for unknown material.However, it was observed that Q can be related to pressure drop.Dr. Aldo Acevedo - ERC SOPS
36
Weissenberg-Rabinowitsch expression:
Integrating by parts:
Applying a change in variables:
Capillary Flow – Shear Rate
R
R
z
drrQ
rdrrvQ
0
2
0
)(2
R
rRrz rzrz
R
R
dR
Q
0
2
3
3
Dr. Aldo Acevedo - ERC SOPS 37
Differentiate with respect to tR and apply Leibnitz rule
Rearranging:
Capillary Flow – Shear Rate
2
0
23
0
23
)(4)(4)(
)(4
RRrzrzrzR
RaR
rzrzrzRa
R
R
dd
d
d
R
aaRR d
d
ln
ln3
4
1)(
rzrzrz
R
a
R
dR
Q
0
2
33)(
44
0
Weissenberg-Rabinowitsch correctionDr. Aldo Acevedo - ERC SOPS 38
Thus viscosity may be calculated by measurements of Q to obtain the shear rate and measurements of pressure drop to obtain stress, and the geometric constants R and L.
Capillary Flow – Viscosity
1
ln
ln3
4)(
R
a
a
RR d
d
Dr. Aldo Acevedo - ERC SOPS 39
Capillary Flow
Advantages:
1. Simple – experimentally and equipment set-up
2. Inexpensive
3. Higher shear rates
Disadvantages:
1. May need multiple corrections: End effects Wall slip Temperature
2. No good temperature control
Dr. Aldo Acevedo - ERC SOPS 40
Capillary Flow – Glass Viscometers
Dr. Aldo Acevedo - ERC SOPS 41
Dr. Aldo Acevedo - ERC SOPS 42
Extensional Rheometers
Difficult to measure, difficult to construct. Usually “home-made” rheometers Common for solids, not for fluids
Dr. Aldo Acevedo - ERC SOPS 43
Filament Stretching Extensional Rheometers
Devices for measuring the extensional viscosity of moderately viscous non-Newtonian fluids
A cylindrical liquid bridge is initially formed between two circular end-plates. The plates are then moved apart in a prescribed manner such that the fluid sample is subjected to a strong extensional deformation.
Dr. Aldo Acevedo - ERC SOPS 44
Filament Stretching Extensional Rheometers
The kinematics closely approximate those of an ideal homogeneous uniaxial elongation.
The evolution in the tensile stress (measured mechanically) and the molecular conformation (measured optically) can be followed as functions of the rate of stretching and the total strain imposed.
Extensional flows are irrotational and extremely efficient at unraveling flexible macromolecules or orienting rigid molecules.
If it was possible to maintain the flow field, all molecules would eventually be fully extended and aligned.
McKinley and Sridhar, “Filament-Stretching Rheometry of Complex Fluids”, Annual Reviews of Fluid Mechanics, 34 375-415 (2002)
Dr. Aldo Acevedo - ERC SOPS 45
Instrument Design
The drive train accommodates the end plates, and the electronic control system imposes a predetermined velocity profile on one or both of the end plates.
The principal time-resolved measurements required are the force F(t) on one of the end plates and the filament diameter at the mid-plane.
The geometric dimensions and motor capacity of the motion-control system determine the range of experimental parameters accessible in a given device.
Dr. Aldo Acevedo - ERC SOPS 46
Operating Space
The maximum length, Lmax, and the maximum velocity, Vmax, bound the operating space.
An ideal uniaxial extensional flow is represented as a straight line on this diagram, with the slope equal to the imposed strain rate.
A given experiment will be limited by either the total travel available to the motor plates or by the maximum velocity the motors can sustain.
A characteristic value is the critical strain rate E* = Vmax/Lmax, where both limits are simultaneously achieved.
Operating Space
The operation space accessible for a given fluid may be constrained by instabilities associated with gravitational sagging, capillarity or elasticity.
The instabilities can arise from either the interfacial tension of the fluid or the intrinsic elasticity of the fluid column.
Dr. Aldo Acevedo - ERC SOPS 48
Flow
Initial aspect ratio Lo/Ro.
The diameter of the filament is axially uniform as desired for homogeneous elongation.
However, the no-slip condition at the endplates does cause a deviation from uniformity.
Thus, the diameter is usually measured at the middle of the filament.Dr. Aldo Acevedo - ERC SOPS 49
Flow
Initial aspect ratio Lo/Ro.
The diameter of the filament is axially uniform as desired for homogeneous elongation.
However, the no-slip condition at the endplates does cause a deviation from uniformity.
Thus, the diameter is usually measured at the middle of the filament.
Dr. Aldo Acevedo - ERC SOPS 50
Equations to Analyze Flow
The time-dependent total force needed to deform the sample can be measured by a load cell and related to the total stress as:
where, f(t) is the magnitude of the tensile force
A(t) is the changing cross-sectional area
The normal stress difference is thus:
)(
)(
tA
tfPatmzz
)(
)(
tA
tfrrzzrrzz
Dr. Aldo Acevedo - ERC SOPS 51
Equations to Analyze Flow
If the flow is homogeneous from start-up of steady elongation:
The elongational viscosity growth function can be calculated from a measurement of f(t) alone.
The steady elongational viscosity:
teAtA 00)(
00
00
0
0)(
A
ef
A
etf
t
t
Usually not reached.
from the Hencky strain EQ 5.174
Dr. Aldo Acevedo - ERC SOPS 52
Equations to Analyze Flow
It is usually difficult to measure the length, thus the diameter at mid section is measure. However, these are not directly proportionally.
Ideal elongation of a cylinder -> p(t) = 2Lubrication theory (at short times) -> p(t) = 4/3
Experimentally a two-step procedure: Constant elongational rate based on the filament length is first imposed
and the mid filament diameter is measured. A calibration curve of Hencky strain based on length vs Hencky strain
based on mid-filament diameter is produced. The curve is then used in a second experiment to program the plate
separation that will result in exponentially decreasing diameter.
)(
0
0 )(
)(tp
tD
D
l
tl
Dr. Aldo Acevedo - ERC SOPS 53
L-D Calibration Plot
)/ln(2
)/ln(
0
0
DD
ll
midD
L
Anna, etal “An interlaboratory comparison of measurements from filament-stretching rheometers using common test fluids”, Journal of Rheology 45(1) 83-114 (2001)
Dr. Aldo Acevedo - ERC SOPS 54
Controlled Filament Diameter Profiles
Dr. Aldo Acevedo - ERC SOPS 55
Elongational Viscosity
The unsteady extensional viscosity is obtained from:
Where the strain rate is obtained by fitting to the raw diameter data.
The Trouton ratio (or dimensionless extensional viscosity) is:
00
11330
)()()(
rrzz
0
0 )(
TrZero-shear steady shear viscosity
For Newtonian fluids Tr = 3.
The Trouton viscosity is defined as 3 times the z-s ss viscosity
Dr. Aldo Acevedo - ERC SOPS 56
Elongational Viscosity
Representative result
Dr. Aldo Acevedo - ERC SOPS 57
Pros and Cons
Advantages: The sample starts from a well defined initial rest state. Except near the ends, the strain of each material element
is the same.
Disadvantages The deformation near the ends is not homogeneous
uniaxial extension. At short times there is an induction period during which
a secondary flow occurs near the plates due to gravitational and surface tension forces.
Elongational rates calculated based on length differ from those calculated on radius.
Dr. Aldo Acevedo - ERC SOPS 58
Filament Evolution
The general evolution in the experiment typically exhibit three characteristic regimes:
A. Filament elongation • the radius decreases exponentially• At short times (early strains) there is a solvent-dominated peak
in the force followed by a steady decline due to the exponential decrease in the cross-sectional area.
• Intermediate times (or strains) the force begins to increase again owing to the strain hardening in the tensile stress. Since the area decreases, an increase in the force indicates that the stress is increasing faster that the exponential of the strain.
• At very large strains, a second maximm in the force may be observved after th eextensional stresses saturate and the extensional viscosity of the fluid recahes steady-state.
Dr. Aldo Acevedo - ERC SOPS 59
Filament Evolution
The general evolution in the experiment typically exhibit three characteristic regimes:B. Stress relaxation
• The radius remains almost constant.• This region is typically short, lasting only one or two fluid
relaxation times.• As elastic stresses decay, pressure and gravity stresses
dominate and filament breakup ensues
C. Filament break-up• The force decays and the radius decreases in similar manner
Dr. Aldo Acevedo - ERC SOPS 60
Haake CaBER I
Uses a high precision laser micrometer to accurately track the filament diameter as it thins. Aside from its resolution (around 10μm) the micrometer is also immune to large ambient light fluctuations and can resolve small filaments easily (a different issue from the resolution).
The plate motion is controlled by a linear drive motor. The fastest stretch time is of the order of 20 ms (depending on stretch distance) and the motor has a positional resolution of 20 μm.
Reference: Instruction Manual Haake CaBER IDr. Aldo Acevedo - ERC SOPS 61
62
References
Faith Morrison, “Understanding Rheology,” Oxford University Press (2001)
Malkin, A.Y. & A.I. Isayev, “Rheology: Concepts, Methods & Applications,” ChemTec Publishing, Toronto (2006)
Dr. Aldo Acevedo - ERC SOPS 63