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Laplace operators in gamma analysis
Published 1 Nov 2014 in math.PR | (1411.0162v1)
Abstract: Let $\mathbb K(\mathbb Rd)$ denote the cone of discrete Radon measures on $\mathbb Rd$. The gamma measure $\mathcal G$ is the probability measure on $\mathbb K(\mathbb Rd)$ which is a measure-valued L\'evy process with intensity measure $s{-1}e{-s}\,ds$ on $(0,\infty)$. We study a class of Laplace-type operators in $L2(\mathbb K(\mathbb Rd),\mathcal G)$. 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 $\mathbb K(\mathbb Rd)$.
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