English

Potential kernels for radial Dunkl Laplacians

Analysis of PDEs 2019-10-09 v1 Classical Analysis and ODEs

Abstract

We derive two-sided bounds for the Newton and Poisson kernels of the WW-invariant Dunkl Laplacian in geometric complex case when the multiplicity k(α)=1k(\alpha)=1, i.e. for flat complex symmetric spaces. For the invariant Dunkl-Poisson kernel PW(x,y)P^W(x,y), the estimates are PW(x,y)PRd(x,y)α>0 xσαy2k(α), P^W(x,y)\asymp \frac{P^{{\bf R}^d}(x,y)}{\prod_{\alpha > 0 \ }|x-\sigma_\alpha y|^{2k(\alpha)}}, where the α\alpha's are the positive roots of a root system acting in Rd{\bf R}^d, the σα\sigma_\alpha's are the corresponding symmetries and PRdP^{{\bf R}^d} is the classical Poisson kernel in Rd{{\bf R}^d}. Analogous bounds are proven for the Newton kernel when d3d\ge 3. The same estimates are derived in the rank one direct product case Z2N\mathbb Z_2^N and conjectured for general WW-invariant Dunkl processes. As an application, we get a two-sided bound for the Poisson and Newton kernels of the classical Dyson Brownian motion and of the Brownian motions in any Weyl chamber.

Keywords

Cite

@article{arxiv.1910.03105,
  title  = {Potential kernels for radial Dunkl Laplacians},
  author = {Piotr Graczyk and Tomasz Luks and Patrice Sawyer},
  journal= {arXiv preprint arXiv:1910.03105},
  year   = {2019}
}

Comments

31 pages

R2 v1 2026-06-23T11:37:02.542Z