English

Abnormal boundary decay for stable operators

Analysis of PDEs 2026-02-04 v2 Probability

Abstract

Assume α(0,2)\alpha\in (0, 2) and d2d\ge 2. Let Lα\mathcal L^\alpha be the generator of a symmetric, but not necessarily isotropic, α\alpha-stable process XX in Rd\mathbb R^d whose L\'evy density is comparable with that of an isotropic α\alpha-stable process. In this paper, we show that the C1,DiniC^{1, \rm Dini} regularity assumption on an open set DRdD\subset \mathbb R^d is optimal for the standard boundary decay property for nonnegative Lα\mathcal L^\alpha-harmonic functions in DD, and for the standard boundary decay property of the heat kernel pD(t,x,y)p^D(t,x,y) of the part process XDX^D of XX on DD by proving the following: (i) If DD is a C1,DiniC^{1, \rm Dini} open set and hh is a nonnegative function which is Lα\mathcal L^\alpha-harmonic in DD and vanishes near a portion of D\partial D, then the rate at which h(x)h(x) decays to 0 near that portion of D\partial D is dist(x,Dc)α/2{\rm dist} (x, D^c)^{\alpha/2}. (ii) If DD is a C1,DiniC^{1, \rm Dini} open set, then, as xDx\to \partial D, the rate at which pD(t,x,y)p^D(t,x,y) tends to 0 is dist(x,Dc)α/2{\rm dist} (x, D^c)^{\alpha/2}. (iii) For any non-Dini modulus of continuity \ell, there exist non-C1,DiniC^{1, \rm Dini} open sets DD, with D\partial D locally being the graph of a C1,C^{1, \ell} function, such that the standard boundary decay properties above do not hold for DD.

Cite

@article{arxiv.2510.03961,
  title  = {Abnormal boundary decay for stable operators},
  author = {Soobin Cho and Renming Song},
  journal= {arXiv preprint arXiv:2510.03961},
  year   = {2026}
}

Comments

46 pages. Revised version; accepted for publication in the Journal of Differential Equations

R2 v1 2026-07-01T06:17:29.540Z