English

Regularity for fully nonlinear nonlocal parabolic equations with rough kernels

Analysis of PDEs 2014-04-17 v3

Abstract

We prove space and time regularity for solutions of fully nonlinear parabolic integro-differential equations with rough kernels. We consider parabolic equations ut=\Iuu_t = \I u, where \I\I is translation invariant and elliptic with respect to the class L0(σ)\mathcal L_0(\sigma) of Caffarelli and Silvestre, σ(0,2)\sigma\in(0,2) being the order of \I\I. We prove that if uu is a viscosity solution in B1×(1,0]B_1 \times (-1,0] which is merely bounded in Rn×(1,0]\R^n \times (-1,0], then uu is CβC^\beta in space and Cβ/σC^{\beta/\sigma} in time in B1/2×[1/2,0]\overline{B_{1/2}} \times [-1/2,0], for all β<min{σ,1+α}\beta< \min\{\sigma, 1+\alpha\}, where α>0\alpha>0. Our proof combines a Liouville type theorem ---relaying on the nonlocal parabolic CαC^\alpha estimate of Chang and D\'avila--- and a blow up and compactness argument.

Keywords

Cite

@article{arxiv.1401.4521,
  title  = {Regularity for fully nonlinear nonlocal parabolic equations with rough kernels},
  author = {Joaquim Serra},
  journal= {arXiv preprint arXiv:1401.4521},
  year   = {2014}
}

Comments

Some typos fixed and proof of Proposition 4.5 simplified

R2 v1 2026-06-22T02:48:45.601Z