Difference between revisions of "Nonlinear Hardening 2"

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<math>\sigma_y =  \sigma_{Y0}(1+K\alpha^n)</math>
<math>\sigma_y =  \sigma_{Y0}(1+K\alpha^n)</math>


where <math>\sigma_{Y0}</math> is initial yield stress, &alpha; is cumulative equivalent plastic strain, and K and n are dimensionless hardening law coefficients.
where <math>\sigma_{Y0}</math> is initial yield stress, &alpha; is cumulative equivalent plastic strain, and K and n are dimensionless hardening law coefficients. . If K &lt; 0, the law is softening instead of hardening. The amount of softening can be limited by the <tt>yieldMin</tt> property.


An alternate [[Nonlinear Hardening 1|nonlinear hardening law]] is also available.
An alternate [[Nonlinear Hardening 1|nonlinear hardening law]] is also available.

Revision as of 13:42, 25 April 2017

In this nonlinear hardening law, the yield stress is given by

      [math]\displaystyle{ \sigma_y = \sigma_{Y0}(1+K\alpha^n) }[/math]

where [math]\displaystyle{ \sigma_{Y0} }[/math] is initial yield stress, α is cumulative equivalent plastic strain, and K and n are dimensionless hardening law coefficients. . If K < 0, the law is softening instead of hardening. The amount of softening can be limited by the yieldMin property.

An alternate nonlinear hardening law is also available.

Hardening Law Properties

The material parameters in this hardening law are defined with the following properties:

Property Description
yield The initial yield stress (enter in pressure units). This stress corresponds to the axial stress at yield during uniaxial, 3D loading.
Khard The dimensionless parameter K for nonlinear hardening.
nhard The dimensionless exponent parameter (n) in the nonlinear hardening law. If n=1, it is more efficient to use linear hardening instead.

History Data

This hardening law defines one history variable, which is stored as history variable #1. It stores the the cumulative equivalent plastic strain (absolute) defined as

      [math]\displaystyle{ \alpha = \sum \sqrt{2\over3}\ ||d\varepsilon_p|| }[/math]

where dεp is the incremental plastic strain tensor in one time step.