English

Gibbs cluster measures on configuration spaces

Functional Analysis 2010-07-20 v1

Abstract

The distribution gclg_{cl} of a Gibbs cluster point process in X=RdX=\mathbb{R}^{d} (with i.i.d. random clusters attached to points of a Gibbs configuration with distribution gg) is studied via the projection of an auxiliary Gibbs measure g^\hat{g} in the space of configurations gamma^={(x,yˉ)}X×X\hat{gamma}=\{(x,\bar{y})\}\subset X\times\mathfrak{X}, where xXx\in X indicates a cluster "center" and yˉX:=nXn\bar{y}\in\mathfrak{X}:=\bigsqcup_{n} X^n represents a corresponding cluster relative to xx. We show that the measure gclg_{cl} is quasi-invariant with respect to the group Diff0(X)\mathrm{Diff}_{0}(X) of compactly supported diffeomorphisms of XX, and prove an integration-by-parts formula for gclg_{cl}. The associated equilibrium stochastic dynamics is then constructed using the method of Dirichlet forms. These results are quite general; in particular, the uniqueness of the background Gibbs measure gg is not required. The paper is an extension of the earlier results for Poisson cluster measures %obtained by the authors [J. Funct. Analysis 256 (2009) 432-478], where a different projection construction was utilized specific to this "exactly soluble" case.

Keywords

Cite

@article{arxiv.1007.3148,
  title  = {Gibbs cluster measures on configuration spaces},
  author = {Leonid Bogachev and Alexei Daletskii},
  journal= {arXiv preprint arXiv:1007.3148},
  year   = {2010}
}

Comments

46 pages

R2 v1 2026-06-21T15:49:47.931Z