Difference between revisions of "Linear Hardening"

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(Created page with "In the linear hardening law, the yield stress is given by <math>\sigma_y = \sigma_{Y0} + E_p\varepsilon_p = \sigma_{Y0}(1+K\varepsilon_p)</math> where <ma...")
 
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== History Data ==
== History Data ==


This [[Hardening Laws|hardening law]]  define one history variable, which is stored as history variable #1. It stores the the cumulative equivalent plastic strain (absolute) defined as the sum of
This [[Hardening Laws|hardening law]]  defines one history variable, which is stored as history variable #1. It stores the the cumulative equivalent plastic strain (absolute) defined as the sum of


<math>\sqrt{2\over3}\ ||d\varepsilon_p||</math>
<math>\sqrt{2\over3}\ ||d\varepsilon_p||</math>


over each time step.
over each time step.

Revision as of 12:05, 21 May 2013

In the linear hardening law, the yield stress is given by

[math]\displaystyle{ \sigma_y = \sigma_{Y0} + E_p\varepsilon_p = \sigma_{Y0}(1+K\varepsilon_p) }[/math]

where [math]\displaystyle{ \sigma_{Y0} }[/math] is initial yield stress, Ep is the plastic modulus, [math]\displaystyle{ \varepsilon_p }[/math] is equivalent plastic strain, and K is a hardening coefficient.

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 units of MPa). This stress corresponds to the axial stress at yield during uniaxial, 3D loading.
Ep The plastic modulus (enter in units of MPa). This modulus is the slope of total stress as a function of plastic strain during uniaxial, 3D loading. The default is 0.0 which results in an elastic-perfectly plastic material or a material with no work hardening.
Khard Alternatively, you can enter this dimensionless parameter for hardening. It is only used if Ep is not entered and when entered, it is convert to Ep using Ep = [math]\displaystyle{ \sigma_{Y0}K }[/math].

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 the sum of

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

over each time step.