-convergence for power-law functionals with variable exponents

Abstract

We study the -convergence of the functionals Fn(u):= || f(·,u(·),Du(·))||pn(·) and Fn(u):= ∫ 1pn(x) fpn(x)(x,u(x),Du(x))dx defined on X∈ \L1(,Rd), L∞(,Rd), C(,Rd)\ (endowed with their usual norms) with effective domain the Sobolev space W1,pn(·)(, Rd ). Here ⊂eq RN is a bounded open set, N,d 1 and the measurable functions pn: → (1, + ∞) satisfy the conditions ess\: sup \ pn \, β \, ess\: inf \ pn for a fixed constant β > 1 and ess\: inf \ pn → + ∞ as n → + ∞. We show that when f(x,u,·) is level convex and lower semicontinuous and it satisfies a uniform growth condition from below, then, as n ∞, the sequences (Fn)n -converges in X to the functional F represented as F(u)= || f(·,u(·),Du(·))||∞ on the effective domain W1,∞(, Rd ). Moreover we show that the -n Fn is given by the functional F(u):=\ arraylll \!\!\!\!\!\! & 0 & if || f(·,u(·),Du(·)) ||∞≤ 1,\\ \!\!\!\!\!\! & +∞ & otherwise in X.\\ array.