A Generalized Choquard equation with weighted anisotropic Stein-Weiss potential on nonreflexive Orlicz-Sobolev Spaces

Abstract

In this paper we investigate the existence of solution for the following nonlocal problem with anisotropic Stein-Weiss convolution term - u+V(x)φ(|u|)u=1|x|α(∫RN K(y)F(u(y))|x-y|λ|y|αdy)K(x)f(u(x)),\;\;x∈ RN where α≥ 0, N ≥ 2, λ>0 is a positive parameter, V,K∈ C( RN,[0,∞)) are nonnegative functions that may vanish at infinity, the function f∈ C (R, R) is quasicritical and F(t)=∫0tf(s)ds. To establish our existence and regularity results, we use the Hardy-type inequalities for Orlicz-Sobolev Space and the Stein-weiss inequality together with a variational technique based on the mountain pass theorem for a functional that is not necessarily in C1. Furthermore, we also prove the existence of a ground state solution by the method of Nehari manifold in the case where the strict monotonicity condition on f is not required. This work incorporates the case where the N-function does not verify the 2-condition.