English

Regularity for fully nonlinear integro-differential operators with regularly varying kernels

Analysis of PDEs 2014-08-04 v2

Abstract

In this paper, the regularity results for the integro-differential operators of the fractional Laplacian type by Caffarelli and Silvestre \cite{CS1} are extended to those for the integro-differential operators associated with symmetric, regularly varying kernels at zero. In particular, we obtain the uniform Harnack inequality and H\"older estimate of viscosity solutions to the nonlinear integro-differential equations associated with the kernels Kσ,βK_{\sigma, \beta} satisfying Kσ,β(y)2σyn+σ(log2y2)β(2σ)\mboxnearzero K_{\sigma,\beta}(y)\asymp \frac{ 2-\sigma}{|y|^{n+\sigma}}\left( \log\frac{2}{|y|^2}\right)^{\beta(2-\sigma)}\quad \mbox{near zero} with respect to σ(0,2)\sigma\in(0,2) close to 22 (for a given βR\beta\in\mathbb R), where the regularity estimates do not blow up as the order σ(0,2) \sigma\in(0,2) tends to 2.2.

Keywords

Cite

@article{arxiv.1405.4970,
  title  = {Regularity for fully nonlinear integro-differential operators with regularly varying kernels},
  author = {Soojung Kim and Yong-Cheol Kim and Ki-Ahm Lee},
  journal= {arXiv preprint arXiv:1405.4970},
  year   = {2014}
}

Comments

31pages

R2 v1 2026-06-22T04:18:37.613Z