p-th Kazdan-Warner equation on graph

Abstract

Let G=(V,E) be a connected finite graph and C(V) be the set of functions defined on V. Let p be the discrete p-Laplacian on G with p>1 and L=p-k, where k∈ C(V) is positive everywhere. Consider the operator L:C(V)→ C(V). We prove that -L is one to one, onto and preserves order. So it implies that there exists a unique solution to the equation Lu=f for any given f∈ C(V). We also prove that the equation pu=f-f has a solution which is unique up to a constant, where f is the average of f. With the help of these results, we finally give various conditions such that the p-th Kazdan-Warner equation pu=c-heu has a solution on V for given h∈ C(V) and c∈ R. Thus we generalize Grigor'yan, Lin and Yang's work GLY for p=2 to any p>1.