Yamabe type equations on graphs

Abstract

Let G=(V,E) be a locally finite graph, ⊂ V be a bounded domain, be the usual graph Laplacian, and λ1() be the first eigenvalue of - with respect to Dirichlet boundary condition. Using the mountain pass theorem due to Ambrosetti-Rabinowitz, we prove that if α<λ1(), then for any p>2, there exists a positive solution to - u-α u=|u|p-2u in , u=0 on ∂, where and ∂ denote the interior and the boundary of respectively. Also we consider similar problems involving the p-Laplacian and poly-Laplacian by the same method. Such problems can be viewed as discrete versions of the Yamabe type equations on Euclidean space or compact Riemannian manifolds.