Some Liouville Theorems for the p-Laplacian

Abstract

We present several Liouville type results for the p-Laplacian in N. Suppose that h is a nonnegative regular function such that h(x) = a|x|γ\ for\ |x|\ large,\ a>0\ and\ γ> -p. We obtain the following non -existence result: 1) Suppose that N>p>1, and u∈ W1,ploc (N) C (N) is a nonnegative weak solution of - div (|∇ u|p-2 ∇ u) ≥ h(x) uq \;\;in \; N . Suppose that p-1< q≤ (N+γ)(p-1) N-p then u 0. 2) Let N≤ p. If u∈ W1,ploc (N) C (N) is a weak solution bounded below of - div (|∇ u|p-2 ∇ u)≥ 0 in N then u is constant. 3) Let N>p if u is bounded from below and - div (|∇ u|p-2 ∇ u)=0 in N then u is constant. 4)If -p u+h(x) uq≤ 0, . If q> p-1, then u 0.

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