Partial gradient regularity for parabolic systems with degenerate diffusion and H\"older continuous coefficients

Abstract

We consider vector valued weak solutions u:T RN with N∈ N of degenerate or singular parabolic systems of type equation* ∂t u - div \, a(z,u,Du) = 0 T= × (0,T), equation* where denotes an open set in Rn for n≥ 1 and T>0 a finite time. Assuming that the vector field a is not of Uhlenbeck-type structure, satisfies p-growth assumptions and (z,u) a(z,u,) is H\"older continuous for every ∈ RNn, we show that the gradient Du is partially H\"older continuous, provided the vector field degenerates like that of the p-Laplacian for small gradients.

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