Homogenization of supremal functionals in the vectorial case (via Lp-approximation)

Abstract

We propose a homogenized supremal functional rigorously derived via Lp-approximation by functionals of the type x∈ess-sup0.03cm f(x, Du), when is a bounded open set of Rn and u∈ W1,∞(; Rd). The homogenized functional is also deduced directly in the case where the sublevel sets of f(x,·) satisfy suitable convexity properties, as a corollary of homogenization results dealing with pointwise gradient constrained integral functionals.

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