Classical solutions and higher regularity for nonlinear fractional diffusion equations

Abstract

We study the regularity properties of the solutions to the nonlinear equation with fractional diffusion ∂tu+(-)σ/2(u)=0, posed for x∈ RN, t>0, with 0<σ<2, N1. If the nonlinearity satisfies some not very restrictive conditions: ∈ C1,γ(R), 1+γ>σ, and '(u)>0 for every u∈R, we prove that bounded weak solutions are classical solutions for all positive times. We also explore sufficient conditions on the non-linearity to obtain higher regularity for the solutions, even C∞ regularity. Degenerate and singular cases, including the power nonlinearity (u)=|u|m-1u, m>0, are also considered, and the existence of classical solutions in the power case is proved.