Multiple solutions of double phase variational problems with variable exponent

Abstract

This paper deals with the existence of multiple solutions for the quasilinear equation -div\,A(x,∇ u)| u| α (x)-2u=f(x,u) in R N, which involves a general variable exponent elliptic operator A in divergence form. The problem corresponds to double phase anisotropic phenomena, in the sense that the differential operator has behaviors like | | q(x)-2 for small | | and like | | p(x)-2 for large | | , where 1<α (· )≤ p(· )<q(· )<N. Our aim is to approach variationally the problem by using the tools of critical points theory in generalized Orlicz-Sobolev spaces with variable exponent. Our results extend the previous works Azzollini, d'Avenia, and Pomponio (2014) and Chorfi and Radulescu (2016), from the case when exponents p and q are constant, to the case when p(· ) and % q(· ) are functions. We also substantially weaken some of their hypotheses overcome the lack of compactness by using the weighting method.