Analysis on the cone of discrete Radon measures

arXiv - PHYS - Mathematical Physics Pub Date : 2023-12-06 DOI:arxiv-2312.03537
Dmitri Finkelshtein, Yuri Kondratiev, Peter Kuchling, Eugene Lytvynov, Maria Joao Oliveira
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Abstract

We study analysis on the cone of discrete Radon measures over a locally compact Polish space $X$. We discuss probability measures on the cone and the corresponding correlation measures and correlation functions on the sub-cone of finite discrete Radon measures over $X$. For this, we consider on the cone an analogue of the harmonic analysis on the configuration space developed in [12]. We also study elements of the difference calculus on the cone: we introduce discrete birth-and-death gradients and study the corresponding Dirichlet forms; finally, we discuss a system of polynomial functions on the cone which satisfy the binomial identity.
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离散拉顿量锥上的分析
我们研究局部紧凑波兰空间 $X$ 上离散 Radon 度量锥上的分析。我们讨论锥体上的概率度量以及与之对应的相关度量和相关函数。我们还研究了锥体上的差分微积分元素:我们引入了离散生死梯度并研究了相应的 Dirichlet 形式;最后,我们讨论了锥体上满足二项式同一性的多项式函数系统。
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arXiv - PHYS - Mathematical Physics
arXiv - PHYS - Mathematical Physics
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