-convergence of energy functionals in fractional Orlicz spaces beyond the 2 condition
Abstract
Given a Young function A, n≥ 1 and s∈(0,1) we consider the energy functional Js(u)=(1-s)Rn× Rn A(|u(x)-u(y)||x-y|s)dxdy|x-y|n. Without assuming the 2 condition on A not its conjugated function A, we prove the following liminf inequality: if u∈ EA(Rn) and \uk\k∈N⊂ EA(Rn) is such that uk u in EA(Rn), and sk 1, then J(u) ≤ k∞ Jsk(uk), where J is a limit functional related with the behavior of the fractional Orlicz-Sobolev spaces as s 1+. As a direct consequence, we obtain the -convergence of the functional Js. Finally, we extend our result to the study of the so called fractional peridynamic case.
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