Existence and convergence of solutions to p-Laplace equations on locally finite graphs

Abstract

We are mainly concerned with the nonlinear p-Laplace equation equation* -pu+|u|p-2u=(x,u) equation* on a locally finite graph G=(V,E), where p belongs to (1, +∞). We obtain existence of positive solutions and positive ground state solutions by using the mountain-pass theorem and the Nehari manifold respectively. Moreover, we also analyze the asymptotic behavior for a sequence of positive ground state solutions. Compared with all the existing relevant works, our results have made essential improvements in at least three aspects: (i) p can take any value in (1, +∞); (ii) the conditions on the graph G and the potential are relaxed; (iii) for the existence of positive solutions, the growth condition in previous works on the nonlinear term (x,s) as s→ +∞ is removed.