-convergence and stochastic homogenisation of singularly-perturbed elliptic functionals

Abstract

We study the limit behaviour of singularly-perturbed elliptic functionals of the form \[ Fk(u,v)=∫A v2\,fk(x,∇ u)\.dx+1k∫A gk(x,v,k∇ v)\.dx\,, \] where u is a vector-valued Sobolev function, v ∈ [0,1] a phase-field variable, and k>0 a singular-perturbation parameter, i.e., k 0, as k +∞. Under mild assumptions on the integrands fk and gk, we show that if fk grows superlinearly in the gradient-variable, then the functionals Fk -converge (up to subsequences) to a brittle energy-functional, i.e., to a free-discontinuity functional whose surface integrand does not depend on the jump-amplitude of u. This result is achieved by providing explicit asymptotic formulas for the bulk and surface integrands which show, in particular, that volume and surface term in Fk decouple in the limit. The abstract -convergence analysis is complemented by a stochastic homogenisation result for stationary random integrands.