Positive solutions to fractional p-Laplacian Choquard equation on lattice graphs

Abstract

In this paper, we study the fractional p-Laplacian Choquard equation (-)ps u+h(x)|u|p-2 u=(Rα *F(u))f(u) on lattice graphs Zd, where s∈(0,1), p≥ 2, α ∈(0, d) and Rα represents the Green's function of the discrete fractional Laplacian that behaves as the Riesz potential. Under suitable assumptions on the potential function h, we first prove the existence of a strictly positive solution by the mountain-pass theorem for the nonlinearity f satisfying some growth conditions. Moreover, if we add some monotonicity condition, we establish the existence of a positive ground state solution by the method of Nehari manifold.