Positive Solutions of p-th Yamabe Type Equations on Graphs

Abstract

Let G=(V,E) be a finite connected weighted graph, and assume 1≤α≤ p≤ q. In this paper, we consider the following p-th Yamabe type equation -pu+huq-1=λ fuα-1. on G, where p is the p-th discrete graph Laplacian, h≤0 and f>0 are real functions defined on all vertices of G. Instead of the approach in [Ge3], we adopt a new approach, and prove that the above equation always has a positive solution u>0 for some constant λ∈R. In particular, when q=p our result generalizes the main theorem in [Ge3] from the case of α≥ p>1 to the case of 1≤α≤ p. It's interesting that our new approach can also work in the case of α≥ p>1.