Ogden–Roxburgh model

The Ogden–Roxburgh model^[1] is an approach published in 1999 which extends hyperelastic material models to allow for the Mullins effect.^[2] It is used in several commercial finite element codes, and is named after R.W. Ogden and D. G. Roxburgh. The fundamental idea of the approach can already be found in a paper by De Souza Neto et al. from 1994.^[3]

The basis of pseudo-elastic material models is a hyperelastic second Piola–Kirchhoff stress ${\displaystyle {𝑺}_0}$, which is derived from a suitable strain energy density function ${\displaystyle W(𝑪)}$:

${\displaystyle 𝑺=2\frac{\partial W}{\partial 𝑪}.}$

The key idea of pseudo-elastic material models is that the stress during the first loading process is equal to the basic stress ${\displaystyle {𝑺}_0}$. Upon unloading and reloading ${\displaystyle {𝑺}_0}$ is multiplied by a positive softening function ${\displaystyle \eta }$. The function ${\displaystyle \eta }$ thereby depends on the strain energy ${\displaystyle W(𝑪)}$ of the current load and its maximum ${\displaystyle W_{max}(t):=\max \{W(\tau ),\tau \le t\}}$ in the history of the material:

${\displaystyle 𝑺=\eta (W,W_{max}){𝑺}_0,\text{where }\eta \{\begin{array}{cc}=1,& W=W_{max},\\ <1,& W<W_{max}\end{array}.}$

It was shown that this idea can also be used to extend arbitrary inelastic material models for softening effects.^[4]