On doubly nonlocal p-fractional coupled elliptic system

Abstract

We study the following nonlinear system with perturbations involving p-fractional Laplacian equation* (P)\ split (-)sp u+ a1(x)u|u|p-2 &= α(|x|-μ*|u|q)|u|q-2u+ β (|x|-μ*|v|q)|u|q-2u+ f1(x)\; in\; Rn,\\ (-)sp v+ a2(x)v|v|p-2 &= γ(|x|-μ*|v|q)|v|q-2v+ β (|x|-μ*|u|q)|v|q-2v+ f2(x)\; in\; Rn, split . equation* where n>sp, 0<s<1, p≥2, μ ∈ (0,n), p2( 2-μn) < q <p*s2( 2-μn), α,β,γ >0, 0< ai ∈ C1( Rn, R), i=1,2 and f1,f2: Rn R are perturbations. We show existence of atleast two nontrivial solutions for (P) using Nehari manifold and minimax methods.