Positive Solutions of p-th Yamabe Type Equations on Infinite Graphs
Abstract
Let G=(V,E) be a connected infinite and locally finite weighted graph, p be the p-th discrete graph Laplacian. In this paper, we consider the p-th Yamabe type equation -pu+h|u|p-2u=guα-1 on G, where h and g are known, 2<α≤ p. The prototype of this equation comes from the smooth Yamabe equation on an open manifold. We prove that the above equation has at least one positive solution on G.
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