Problems involving the fractional g-Laplacian with Lack of Compactness

Abstract

In this paper we prove compact embedding of a subspace of the fractional Orlicz-Sobolev space Ws, G(RN) consisting of radial functions, our target embedding spaces are of Orlicz type. Also, we prove a Lions and Lieb type results for Ws,G(RN) that works together in a particular way to get a sequence whose the weak limit is nontrivial. As an application, we study the existence of solutions to Quasilinear elliptic problems in the whole space RN involving the fractional g-Laplacian operator, where the conjugated function G of G doesn't satisfy the 2-condition.

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