Existence and convergence of ground state solutions for a (p,q)-Laplacian system on weighted graphs

Abstract

We investigate the existence of ground state solutions for a (p,q)-Laplacian system with p,q>1 and potential wells on a weighted locally finite graph G=(V,E). By making use of the method of Nehari manifold and the Lagrange multiplier rule, we prove that if the nonlinear term F takes on the super-(p, q)-linear growth and the potential functions a(x) and b(x) satisfy some suitable conditions, then for any fixed parameter λ≥1, the system is provided with a ground state solution (uλ, vλ). Additionally, we set up the convergence property of the solutions set \(uλ, vλ)\ when λ → +∞.