Gradient estimates for singular parabolic p-Laplace type equations with measure data

Abstract

We are concerned with gradient estimates for solutions to a class of singular quasilinear parabolic equations with measure data, whose prototype is given by the parabolic p-Laplace equation ut-p u=μ with p∈ (1,2). The case when p∈ (2-1n+1,2) were studied in [15]. In this paper, we extend the results in [15] to the open case when p∈ (2nn+1,2-1n+1] if n≥ 2 and p∈(54, 32] if n=1. More specifically, in a more singular range of p as above, we establish pointwise gradient estimates via linear parabolic Riesz potential and gradient continuity results via certain assumptions on parabolic Riesz potential.