H\"older-Zygmund Estimates for Degenerate Parabolic Systems

Abstract

We consider energy solutions of the inhomogeneous parabolic p-Laplacien system ∂t u-div(|D u|p-2D u)=-div g. We show in the case p≥ 2 that if the right hand side g is locally in L∞(BMO), then u is locally in L∞(C1), where C1 is the 1-H\"older--Zygmund space. This is the borderline case of the Calder\'on-Zygmund theorey. We provide local quantitative estimates. We also show that finer properties of g are conserved by D u, e.g.\ H\"older continuity. Moreover, we prove a new decay for gradients of p-caloric solutions for all 2nn+2<p<∞.