On the equivalence of Lp-parabolicity and Lq-liouville property on weighted graphs
Abstract
We study the equivalence between the Lp-parabolicity, the Lq-Liouville property of positive super-harmonic functions, and the existence of nonharmonic positive solutions to the following elliptic differential system equation* \ arraylr - u≥ 0, (| u|p-2 u)≥ 0, array . equation* on weighted graphs, where 1≤ p< ∞, and (p, q) are H\"older conjugate exponent pair. Furthermore, by refining a new technique on estimate of heat kernel, we can establish two-sided estimates of Green function on graph, and find the sharp volume growth criteria for the Lq-Liouville property on a large class of graphs. As an application, many non-trivial interesting examples are presented.
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