On a class of quasilinear elliptic equation with indefinite weights on graphs

Abstract

Suppose that G=(V, E) is a connected locally finite graph with the vertex set V and the edge set E. Let ⊂ V be a bounded domain. Consider the following quasilinear elliptic equation on graph G \ arraylcr -pu= λ K(x)|u|p-2u+f(x,u), \ \ x∈, u=0, \ \ x∈∂ , \\ array . where and ∂ denote the interior and the boundary of respectively, p is the discrete p-Laplacian, K(x) is a given function which may change sign, λ is the eigenvalue parameter and f(x,u) has exponential growth. We prove the existence and monotonicity of the principal eigenvalue of the corresponding eigenvalue problem. Furthermore, we also obtain the existence of a positive solution by using variational methods.