H\"older Continuity of the Gradient of Solutions to Doubly Non-Linear Parabolic Equations

Abstract

This paper is devoted to studying the local behavior of non-negative weak solutions to the doubly non-linear parabolic equation equation* ∂t uq - div(|D u|p-2D u) = 0 equation* in a space-time cylinder. H\"older estimates are established for the gradient of its weak solutions in the super-critical fast diffusion regime 0<p-1< q<N(p-1)(N-p)+ where N is the space dimension. Moreover, decay estimates are obtained for weak solutions and their gradient in the vicinity of possible extinction time. Two main components towards these regularity estimates are a time-insensitive Harnack inequality that is particular about this regime, and Schauder estimates for the parabolic p-Laplace equation.