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- As long as the stress point stays on the yield surface, the material stays in a yielded state. However, the stress point does not remain in one place. The stresses can change after yield, even though the material is e-p-p, which means that the stress point can move around the surface. The stress does not change after yield for an ep- p material under for uniaxial stress, and hence biaxial stress is fundamentally different from uniaxial stress.
Figure 2 shows a yielded state, point A, defined by stresses σ 1A
and σ 2A . Suppose that strain increments Δε 1 and Δε 2 are
imposed, causing the stresses to change to σ 1B and σ 2B at point
B. Plasticity theory says that some of the strain increment is an
elastic increment and the remainder is plastic flow. The elastic part
of the strain causes the change in stress. The plastic part causes no
change in stress. This is why the behavior is referred to as elasticplastic.
For yield of an e-p-p material under uniaxial stress there is
no stress change after yield. Hence, all of the strain after yield is
plastic strain.
(3) Plasticity theory also defines the direction of plastic flow. That is,
it defines the ratio between the 1-axis and 2-axis components of
the plastic strain. Essentially, the theory states that the direction of
plastic flow is normal to the yield surface. For example, consider
uniaxial stress along the 1-axis. As shown in Figure 2, the stress
path is OC, and yield occurs at point C. After yield, the stress stays
constant, and hence all subsequent strain is plastic. The normal to
the yield surface at point C has 1-axis and 2-axis components in
the ratio 2:1. Hence, the plastic strains are in this ratio, and the
value of Poisson's ratio is 0.5 for plastic deformation. This agrees
with experimental results.
These ingredients are sufficient to develop an analysis method for the
yielding of steel. In particular, the theory can be extended from the e-pp
case to the case with strain hardening. There are many hardening
theories. PERFORM uses the Mroz theory. For the case of trilinear
behavior the Mroz theory is illustrated in Figure 3.
There are two yield surfaces, namely a Y surface (initial yield) and a
larger U surface (ultimate strength). These surfaces both have the same
shape. If the stress point is inside the Y surface the material is elastic. If
the material is on the Y surface the material is elastic-plastic-strainhardening.
As the material hardens the Y surface moves, as indicated in
the figure. When the stress point reaches the U surface, the material is
elastic-plastic, as in the e-p-p case. Among other things, the Mroz
theory specifies how the Y surface moves as the material strain
hardens.
Figure 3 Trilinear Behavior With Mroz Theory
1.2 Extension to P-M Interaction
1.2.1 Concept
In a piece of steel under biaxial stress, the σ1 and σ 2 stresses interact
with each other. Plasticity theory models this interaction. By analogy,
plasticity theory can be extended to P-M interaction in a column, where
the axial force, P, and the bending moment, M, interact with each other.
For the e-p-p case the yield surface is now the P-M strength interaction
surface for the column cross section.
1.2.2 A Case Where The Analogy Works
Consider a short length of column with a cross section consisting of
two steel fibers (in effect, an I section with one fiber for each flange
and a web that can be ignored). This is shown in Figure 4(a). Each fiber
is elastic-perfectly-plastic with area A and yield stress σY.
A short length of the column is loaded with an axial force, P, and a
bending moment, M, as shown. The axial force is applied at the
reference axis for the column, which is the axis through the cross
section centroid. This is important because it means that when the
column is elastic there is no interaction between P and M. With the reference axis at the centroid, P alone causes axial strain but no
curvature and M alone causes curvature but no axial strain (where axial
strain is measured at the reference axis). If the reference axis is not at
the centroid, P and M interact even before yield.
Figure 4 Simple Steel Column
Each fiber has only uniaxial stress, but the column has P-M interaction.
It is easy to show that the P-M interaction surface is as shown in Figure
4(b). This is the yield surface for plasticity theory.
To see whether plasticity theory correctly predicts the behavior of the
column, consider the behavior when the column is subjected to axial
and bending effects. The loading and behavior are shown in Figure 5.
First, apply axial compression force equal to one half the yield force.
The load path is O-A in Figure 5(a). Then hold this force constant and
increase the moment. The load path is A-B. At Point B Fiber 1 yields in
compression, while Fiber 2 remains elastic. The moment capacity has
now been reached, and the moment-curvature relationship is e-p-p, as
shown in Figure 5(b). However, when one fiber yields the neutral axis
suddenly shifts from the center of the section to the unyielded fiber.
Hence, any subsequent change in curvature is accompanied by a change
in axial strain (always measured at the reference axis). This is shown in
Figure 5(c).
The strains after yield are all plastic. That is, there is plastic bending of
the cross section and plastic axial deformation. When the axial force is
compression the plastic axial strain is compression, so that the column
shortens as it yields in bending. If the column were in tension, it would
extend as it yields in bending.
Figure 5 Behavior of Simple Steel Column
Figure 5(c) shows the changes in curvature, Δψ , and axial strain, Δε ,
after yield. The change in axial strain is Δε = 0.5dΔψ . This is the ratio
that plasticity theory predicts, based on the normal to the yield surface.
In this case, therefore, plasticity theory is correct.
If the bending moment is reversed, keeping the axial force constant,
Fiber 1 immediately unloads, and the cross section returns to an elastic
state with the neutral axis at the center of the section. When the
moment is fully reversed Fiber 2 yields in compression, while Fiber 1
remains elastic. This behavior is correctly predicted by plasticity
theory. Hence, for this column the theory is also correct for cyclic load.
After yield in the opposite direction, the plastic axial strain is again
compression. Hence, as the column is cycled plastically in bending it
progressively shortens. After a number of cycles, the amount of
shortening can be substantial.
This example is for a very simple cross section and for elasticperfectly-
plastic material. However, it indicates that plasticity theory
can correctly account for P-M interaction. Analyses of more complex
cross sections show that plasticity theory can make reasonably accurate
predictions of cross section behavior. Hence, inelastic components
based on plasticity theory can be used to model steel columns with P-M
interaction, for both push-over and dynamic earthquake analyses.
1.2.3 A Case Where the Analogy Does Not Work So Well
Next, consider a simple reinforced concrete section, consisting of two
concrete fibers and two steel fibers as shown in Figure 6(a).
Figure 6 Simple Concrete Column
The steel fibers are elastic-perfectly-plastic. The concrete fibers are ep-
p in compression and have zero strength in tension. The P-M strength
interaction surface for this section is shown in Figure 6(b). For
plasticity theory, this is also the yield surface.
Consider the case with bending moment only, and zero axial force. The
behavior is as follows.
(1) The concrete fiber on the tension side cracks immediately. Hence,
the neutral axis shifts towards the compression side. This poses a
problem for plasticity theory. Specifically, what bending and axial
stiffnesses should be used for elastic behavior before the yield
surface is reached?
(2) As the moment is increased there is both curvature and axial
tension strain (measured at the reference axis). The relationship
between curvature and axial strain depends on the shift of the
neutral axis, which depends on the steel and concrete areas and
moduli. In the plasticity theory there is no P-M interaction in the
elastic range.
(3) When the moment reaches the yield moment the steel fiber on the
tension side yields. The bending stiffness reduces to zero and the
neutral axis shifts to the compression fiber. Plasticity theory
captures this behavior.
(4) The moment remains constant as the curvature increases. The axial
strain is tension. The relationship between axial strain and
curvature is Δε = 0.5dΔψ . Plasticity theory also captures this
behavior.
Hence, plasticity theory correctly predicts the behavior at Steps (3) and
(4), after the yield surface is reached, but the theory has problems in the
elastic range.
Next cycle the bending moment from positive to negative, still with
zero axial force. The behavior is as follows.
(5) When the bending moment is reduced the steel tension fiber
immediately unloads and becomes elastic. Plasticity theory
correctly predicts unloading.
(6) As the moment is decreased the curvature decreases and there is
axial compression strain, which is opposite to Step (2). As before,
plasticity theory does not capture this behavior.
(7) Immediately after the moment reaches zero the second concrete
fiber cracks. Both concrete fibers are now cracked. The neutral
axis moves to the center of the section, and the bending stiffness is
the stiffness of the steel only. Plasticity theory assumes constant
stiffnesses in the elastic range, and does not capture this behavior.
(8) When the moment reaches the strength of the steel fibers, both
fibers yield. Plasticity theory does not capture this behavior.
(9) The steel fiber that previously yielded in tension is now yielding in
compression. When the total strain in this fiber becomes zero the
crack closes in the concrete fiber and it regains stiffness. The
bending stiffness of the section increases and the neutral axis
shifts. Plasticity theory does not capture this behavior.
(10) When the moment reaches the yield moment in the opposite
direction the steel fiber on the tension side yields. The bending
stiffness reduces to zero and the neutral axis shifts to the
compression fiber. Plasticity theory does captures this behavior,
but by now it is too late.
(11) The moment remains constant as the curvature increases, as in Step
(4). The axial strain is tension. Plasticity theory does capture this
behavior, but again it is too late.
In summary, plasticity theory does a mediocre job of modeling
reinforced concrete for monotonically increasing loads, and a poor job
for cyclic loads.
A major error for cyclic loads is that for axial forces below the balance
point, plasticity theory predicts plastic strain in tension after the yield
surface is reached, for both bending directions. Hence, under cyclic
bending the theory predicts that the column will progressively increase
in length. There can be axial growth in reinforced concrete members,
but plasticity theory overestimates the amount for cyclic loading.
1.2.4 Are These Errors Fatal?
The major reason for considering interaction is to account for the
effects of axial force on bending strength. Interaction between bending
and axial deformations tends to be a secondary concern. In a typical
column, the column will extend or shorten as it yields in bending, but
the amount of axial deformation is probably not large. Given the many
other complications and approximations in the modeling of inelastic
behavior in columns, the fact that plasticity theory can overestimate the
amount of axial deformation may not be very important.
This is a decision that you must make. If you use P-M-M hinges in a
column, and if the extension of the column could have a significant
effect on the behavior of the structure, you should examine the
calculated axial extensions (for example using the Hysteresis Loops
task) and satisfy yourself that these deformations are not large enough
to affect the accuracy of the results for design purposes.
If you must calculate axial deformation effects more accurately,
consider using fiber cross sections rather than P-M-M hinges. Fiber
cross sections account for P-M-M interaction, but they use uniaxial
stress-strain relationships and hysteresis loops for the fibers, and hence
do not make use of plasticity theory.
One case where axial deformations are definitely important is for shear
walls. If a shear wall is wide, as it cracks and yields there can be quite
large axial extensions. P-M hinges may not be sufficiently accurate for
modeling inelastic behavior in shear walls. This is why PERFORM
uses only fiber cross sections for inelastic shear walls.
1.3 P-M-M Interaction
1.3.1 General
So far this chapter has considered only biaxial P-M interaction. For a
column element in PERFORM there can be triaxial P-M-M interaction.
The principles are exactly the same, the only difference being that the
yield surface is 3D rather than a 2D. In plasticity theory there are major
changes required to go from uniaxial plasticity to biaxial plasticity.
There are no major changes in going from biaxial to triaxial, or higher.
PERFORM also uses plasticity theory for V-V shear interaction in
shear hinges. Since the mechanism of inelastic shear in reinforced
concrete is not plastic, plasticity theory really does not apply. However,
it should give reasonable results for most practical purposes.
1.3.2 P-M-M Yield Surfaces
PERFORM uses a P-M-M yield surface that is similar to that described
in the following pair of papers : Nonlinear Analysis of Mixed Steel-
Concrete Frames, Parts I and II, by S. El-Tawil and G. Deierlein,
Journal of Structural Engineering, Vol. 126, No. 6, June 2001. This
yield surface requires only a few parameters to define its shape, yet
gives you substantial control over the details of this shape.
When you specify the parameters for a yield surface in PERFORM you
can plot the surface to see the effect of the parameters on its shape.
Steel Yield Surface
Figure 7 shows the yield surface for a steel section.
Figure 7 Steel Type P-M-M Yield Surface
In each P-M plane (P-M2 and P-M3) :
where fPM = yield function value, = 1.0 for yield, P = axial force, M =
bending moment, PY0 = yield force at M = 0 , and MY0 = yield moment
at P = 0.
Different values for the exponent α and the yield force PY0 can be
specified for tension and compression. Different values for the
exponent α can also be used in the P-M2 and P-M3 planes.
El Tawil and Deierlein use β = 1, which causes a sharp peak at P = PY0.
PERFORM requires a value larger than 1.0 for β, with a suggested
value of 1.1. This has little effect on the yield surface for smaller P
values, yet avoids the sharp peak.
For any value of P, Equation (1.1) defines the M values at which yield
occurs, in both the P-M2 and P-M3 planes (put fPM = 1 and solve for M).
Call these values MYP2 and MYP3. The yield function in the M2-M3 plane
is then:
El Tawil and Deierlein suggest values for the exponents α and γ.
Concrete Yield Surface
Figure 8 shows the yield surface for a concrete section.
Figure 8 Concrete Type P-M-M Yield Surface
The equations of the yield surface are essentially as follows.
In each P-M plane:
where fPM = yield function value, = 1.0 for yield, P = axial force, PB =
axial force at balance point (assumed to be the same in both P-M
planes), M = bending moment, PY0 = yield force at M = 0 , and MYB =
yield moment at P = PB .
Different values for the exponent α and the yield force PY0 can be
specified for tension and compression. Different values for the
exponent α can also be used in the P-M2 and P-M3 planes.
El Tawil and Deierlein use β = 1, but PERFORM requires a value
larger than 1.0.
For any value of P, Equation (1.3) defines the M values at which yield
occurs, in both the P-M2 and P-M3 planes (put fPM = 1 and solve for M).
The yield function in the M2-M3 plane is then given by Equation (1.2):
Again, El Tawil and Deierlein suggest values for the exponents α and
γ.
1.3.3 Strain Hardening
For trilinear behavior PERFORM uses the Mroz hardening theory, as
described earlier in this chapter.
1.3.4 Plastic Flow
PERFORM assumes plastic flow normal to the yield surface. Generally
this means that as a P-M-M hinge yields in bending it also extends or
shortens. As considered in this chapter, this may not be an accurate
model of actual behavior. It may be noted that El Tawil and Deierlein
assume no axial plastic deformation in the strain hardening range, and
assume normal plastic flow only when the outer yield surface is
reached. This has not been done in PERFORM, mainly because nonnormal
flow implies a non-symmetrical stiffness matrix, which can
cause both theoretical and computational problems.