Stochastic homogenization of rate-dependent models of monotone type in plasticity

Asymptot. Anal. Pub Date : 2017-01-12 DOI:10.3233/ASY-181502
M. Heida, Sergiy Nesenenko
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引用次数: 8

Abstract

In this work we deal with the stochastic homogenization of the initial boundary value problems of monotone type. The models of monotone type under consideration describe the deformation behaviour of inelastic materials with a microstructure which can be characterised by random measures. Based on the Fitzpatrick function concept we reduce the study of the asymptotic behaviour of monotone operators associated with our models to the problem of the stochastic homogenization of convex functionals within an ergodic and stationary setting. The concept of Fitzpatrick's function helps us to introduce and show the existence of the weak solutions for rate-dependent systems. The derivations of the homogenization results presented in this work are based on the stochastic two-scale convergence in Sobolev spaces. For completeness, we also present some two-scale homogenization results for convex functionals, which are related to the classical Γ-convergence theory.
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塑性单调型速率依赖模型的随机均匀化
本文研究了单调型初始边值问题的随机均匀化问题。所考虑的单调型模型描述了非弹性材料的变形行为,其微观结构可以用随机测量来表征。基于Fitzpatrick函数的概念,我们将与我们的模型相关的单调算子的渐近行为的研究简化为遍历和平稳设置内凸泛函的随机均匀化问题。Fitzpatrick函数的概念帮助我们引入并证明了速率相关系统弱解的存在性。本文提出的均质化结果的推导是基于Sobolev空间的随机双尺度收敛。为了完备性,我们还给出了一些与经典Γ-convergence理论相关的凸泛函的双尺度均匀化结果。
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