English

Stochastic unfolding and homogenization

Analysis of PDEs 2021-05-28 v2

Abstract

The notion of periodic two-scale convergence and the method of periodic unfolding are prominent and useful tools in multiscale modeling and analysis of PDEs with rapidly oscillating periodic coefficients. In this paper we are interested in the theory of stochastic homogenization for continuum mechanical models in form of PDEs with random coefficients, describing random heterogeneous materials. The notion of periodic two-scale convergence has been extended in different ways to the stochastic case. In this work we introduce a stochastic unfolding method that features many similarities to periodic unfolding. In particular it allows to characterize the notion of stochastic two-scale convergence in the mean by mere weak convergence in an extended space. We illustrate the method on the (classical) example of stochastic homogenization of convex integral functionals, and prove a new result on stochastic homogenization for a non-convex evolution equation of Allen-Cahn type. Moreover, we discuss the relation of stochastic unfolding to previously introduced notions of (quenched and mean) stochastic two-scale convergence. The method described in the present paper extends to the continuum setting the notion of discrete stochastic unfolding, as recently introduced by the second and third author in the context of discrete-to-continuum transition.

Keywords

Cite

@article{arxiv.1805.09546,
  title  = {Stochastic unfolding and homogenization},
  author = {Martin Heida and Stefan Neukamm and Mario Varga},
  journal= {arXiv preprint arXiv:1805.09546},
  year   = {2021}
}

Comments

46 pages. This preprint has been split into two parts. For streamlined and extended versions of these parts see arXiv:2105.12447 and arXiv:1905.02562. Please refer to those

R2 v1 2026-06-23T02:06:51.914Z