English

Classical solutions and higher regularity for nonlinear fractional diffusion equations

Analysis of PDEs 2013-12-02 v1

Abstract

We study the regularity properties of the solutions to the nonlinear equation with fractional diffusion tu+(Δ)σ/2φ(u)=0, \partial_tu+(-\Delta)^{\sigma/2}\varphi(u)=0, posed for xRNx\in \mathbb{R}^N, t>0t>0, with 0<σ<20<\sigma<2, N1N\ge1. If the nonlinearity satisfies some not very restrictive conditions: φC1,γ(R)\varphi\in C^{1,\gamma}(\mathbb{R}), 1+γ>σ1+\gamma>\sigma, and φ(u)>0\varphi'(u)>0 for every uRu\in\mathbb{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 CC^\infty regularity. Degenerate and singular cases, including the power nonlinearity φ(u)=um1u\varphi(u)=|u|^{m-1}u, m>0m>0, are also considered, and the existence of classical solutions in the power case is proved.

Keywords

Cite

@article{arxiv.1311.7427,
  title  = {Classical solutions and higher regularity for nonlinear fractional diffusion equations},
  author = {Juan Luis Vázquez and Arturo de Pablo and Fernando Quirós and Ana Rodríguez},
  journal= {arXiv preprint arXiv:1311.7427},
  year   = {2013}
}

Comments

28 pages, 1 figure

R2 v1 2026-06-22T02:17:13.043Z