On a fractional system of NLS-KDV equations with Hardy potentials

Abstract

In this article, our main concern is to study the existence of bound and ground state solutions for the following fractional system of nonlinear Schr\"odinger-Korteweg-De Vries (NLS-KdV, in short) equations with Hardy potentials: equation* \ aligned (-)s1 u - λ1 u|x|2s1 - u2s1*-1 &= 2 h(x) uv & in ~ RN, (-)s2 v - λ2 v|x|2s2 - v2s2*-1 &= h(x) u2 & in ~ RN, u,v >0 in ~ RN \0\, aligned . equation* where s1,s2 ∈ (0,1)~and~λi∈ (0, N,si) with N,si = 2 πN/2 2(N+2si4) (N+2si2)2(N-2si4) ~|(-si)|, (i=1,2). By imposing certain assumptions on the parameter and on the function h, we obtain ground-state solutions using the concentration-compactness principle and the mountain-pass theorem.