English

Cluster point processes on manifolds

Functional Analysis 2011-09-29 v1 Probability

Abstract

The probability distribution μcl\mu_{cl} of a general cluster point process in a Riemannian manifold XX (with independent random clusters attached to points of a configuration with distribution μ\mu) is studied via the projection of an auxiliary measure μ^\hat{\mu} in the space of configurations γ^={(x,yˉ)}X×X\hat{\gamma}=\{(x,\bar{y})\}\subset X\times\mathfrak{X}, where xXx\in X indicates a cluster "centre" and yˉX:=nXn\bar{y}\in\mathfrak{X}:=\bigsqcup_{n} X^n represents a corresponding cluster relative to xx. We show that the measure μcl\mu_{cl} is quasi-invariant with respect to the group Diff0(X)Diff_{0}(X) of compactly supported diffeomorphisms of XX, and prove an integration-by-parts formula for μcl\mu_{cl}. The associated equilibrium stochastic dynamics is then constructed using the method of Dirichlet forms. General constructions are illustrated by examples including Euclidean spaces, Lie groups, homogeneous spaces, Riemannian manifolds of nonpositive curvature and metric spaces. The paper is an extension of our earlier results for Poisson cluster measures [J. Funct. Analysis 256 (2009) 432-478] and for Gibbs cluster measures [arxiv:1007.3148], where different projection constructions were utilised.

Keywords

Cite

@article{arxiv.1109.6283,
  title  = {Cluster point processes on manifolds},
  author = {Leonid Bogachev and Alexei Daletskii},
  journal= {arXiv preprint arXiv:1109.6283},
  year   = {2011}
}
R2 v1 2026-06-21T19:11:59.459Z