Solutions to discrete nonlinear Kirchhoff-Choquard equations with power nonlinearity

Abstract

In this paper, we study the following Kirchhoff-Choquard equation -(a+b ∫Z3|∇ u|2 d μ) u+h(x) u=(Rα|u|p)|u|p-2u, x∈ Z3, where a,\,b>0, α ∈(0,3) are constants and Rα is the Green's function of the discrete fractional Laplacian that behaves as the Riesz potential. Under some suitable assumptions on potential function h, for p>2, we first establish the existence of ground state solutions based on the Nehari manifold. Subsequently, for p>4, we obtain the existence of ground state sign-changing solutions by adopting constrained minimization arguments on the sign-changing Nehari manifold.