New homogenization results for convex integral functionals and their Euler-Lagrange equations

Abstract

We study stochastic homogenization for convex integral functionals u ∫D W(ω,x,∇ u)\,dx,where u:D⊂ Rdm, defined on Sobolev spaces. Assuming only stochastic integrability of the map ω W(ω,0,), we prove homogenization results under two different sets of assumptions, namely 1 W satisfies superlinear growth quantified by the stochastic integrability of the Fenchel conjugate W*(·,0,) and a mild monotonicity condition that ensures that the functional does not increase too much by componentwise truncation of u, 2 W is p-coercive in the sense ||p≤ W(ω,x,) for some p>d-1. Condition 2 directly improves upon earlier results, where p-coercivity with p>d is assumed and 1 provides an alternative condition under very weak coercivity assumptions and additional structure conditions on the integrand. We also study the corresponding Euler-Lagrange equations in the setting of Sobolev-Orlicz spaces. In particular, if W(ω,x,) is comparable to W(ω,x,-) in a suitable sense, we show that the homogenized integrand is differentiable.