English

Laplace operators in gamma analysis

Probability 2014-11-04 v1

Abstract

Let K(Rd)\mathbb K(\mathbb R^d) denote the cone of discrete Radon measures on Rd\mathbb R^d. The gamma measure G\mathcal G is the probability measure on K(Rd)\mathbb K(\mathbb R^d) which is a measure-valued L\'evy process with intensity measure s1esdss^{-1}e^{-s}\,ds on (0,)(0,\infty). We study a class of Laplace-type operators in L2(K(Rd),G)L^2(\mathbb K(\mathbb R^d),\mathcal G). These operators are defined as generators of certain (local) Dirichlet forms. The main result of the papers is the essential self-adjointness of these operators on a set of `test' cylinder functions on K(Rd)\mathbb K(\mathbb R^d).

Cite

@article{arxiv.1411.0162,
  title  = {Laplace operators in gamma analysis},
  author = {D. Hagedorn and Y. Kondratiev and E. Lytvynov and A. Vershik},
  journal= {arXiv preprint arXiv:1411.0162},
  year   = {2014}
}
R2 v1 2026-06-22T06:44:33.755Z