p-Laplacian equations with general Choquard nonlinearity on lattice graphs
Abstract
In this paper, we study the following p-Laplacian equation -p u+h(x)|u|p-2 u=(Rα *F(u))f(u) on lattice graphs ZN, where p≥ 2, α ∈(0,N) are constants and Rα is the Green's function of the discrete fractional Laplacian that behaves as the Riesz potential. Under different assumptions on potential function h, we prove the existence of ground state solutions respectively by the methods of Nehari manifold.
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