A Volume-Growth Criterion for the p-Laplace Inequality on Weighted Graphs

Abstract

We prove a nonexistence result for nonnegative solutions of the quasi-linear elliptic inequality \[ -p u uσ \] on infinite locally finite connected weighted graphs, where 1<p<∞ and σ>p-1. Under the non-p-parabolic setting, we show that every nonnegative solution is identically zero, provided the weighted ball volumes Wn=μ(B(o,n)) satisfy \[ Σn=1∞ npσp-1-1 Wnσ-p+1p-1 =∞ . \] This criterion recovers the known sharp pointwise critical volume-growth threshold and is strictly more flexible, since it allows irregular growth and does not require uniform upper bounds at every large radius. The proof adapts the finite-network current method to the p-Laplace setting, combining a path decomposition with one-dimensional Hardy estimates, p-parallel-sum bounds across metric cuts, and the global p-Green function furnished by non-p-parabolicity.