Weighted Orlicz gradient estimates for the class of singular p-Laplace system

Abstract

Let n ∈ \2, 3, 4, …\, N ∈ \1, 2, 3, …\ and p ∈ (1, 2-1n]. Let β ∈ (1,∞) be such that \[ npn-p<β'<nn(2-p)-1 \] and f ∈ Lβ( Rn; RN). Consider the p-Laplace system \[ -p u=-div(|Du|p-2Du)=f in Rn. \] We obtain a weighted gradient estimate for distributional solutions of this system.