Local gradient estimates for degenerate elliptic equations

Abstract

This paper is focused on the local interior W1,∞-regularity for weak solutions of degenerate elliptic equations of the form div[a(x,u, ∇ u)] +b(x, u, ∇ u) =0, which include those of p-Laplacian type. We derive an explicit estimate of the local L∞-norm for the solution's gradient in terms of its local Lp-norm. Specifically, we prove equation* \|∇ u\|L∞(BR2(x0))p ≤ C|BR(x0)|∫BR(x0)|∇ u(x)|p dx. equation* This estimate paves the way for our forthcoming work in establishing W1,q-estimates (for q>p) for weak solutions to a much larger class of quasilinear elliptic equations.