-convergence and stochastic homogenisation of phase-transition functionals

Abstract

In this paper we studythe asymptotics of singularly perturbed phase-transition functionals of the form \[ Fk(u)=1εk∫A fk(x,u,εk∇ u)\,dx\,, \] where u ∈ [0,1] is a phase-field variable, εk>0 a singular-perturbation parameter, i.e., εk 0, as k +∞, and the integrands fk are such that, for every x and every k, fk(x,· ,0) is a double well potential with zeros at 0 and 1. We prove that the functionals Fk -converge (up to subsequences) to a surface functional of the form \[ F∞(u)=∫Su Af∞(x,u)\,d Hn-1\,,\] where u∈ BV(A;\0,1\) and f∞ is characterised by the double limit of suitably scaled minimisation problems. Afterwards we extend our analysis to the setting of stochastic homogenisation and prove a -convergence result for stationary random integrands.