English

Nonsingular Poisson Suspensions

Dynamical Systems 2020-12-29 v2

Abstract

The classical Poisson functor associates to every infinite measure preserving dynamical system (X,μ,T)(X,\mu,T) a probability preserving dynamical system (X,μ,T)(X^*,\mu^*,T_*) called the Poisson suspension of TT. In this paper we generalize this construction: a subgroup Aut2(X,μ)_2(X,\mu) of μ\mu-nonsingular transformations TT of XX is specified as the largest subgroup for which TT_* is μ\mu^*-nonsingular. Topological structure of this subgroup is studied. We show that a generic element in Aut2(X,μ)_2(X,\mu) is ergodic and of Krieger type III1_1. Let GG be a locally compact Polish group and let A:GAut2(X,μ)A:G\to\text{Aut}_2(X,\mu) be a GG-action. We investigate dynamical properties of the Poisson suspension AA_* of AA in terms of an affine representation of GG associated naturally with AA. It is shown that GG has property (T) if and only if each nonsingular Poisson GG-action admits an absolutely continuous invariant probability. If GG does not have property (T)(T) then for each generating probability κ\kappa on GG and t>0t>0, a nonsingular Poisson GG-action is constructed whose Furstenberg κ\kappa-entropy is tt.

Cite

@article{arxiv.2002.02207,
  title  = {Nonsingular Poisson Suspensions},
  author = {Alexandre I. Danilenko and Zemer Kosloff and Emmanuel Roy},
  journal= {arXiv preprint arXiv:2002.02207},
  year   = {2020}
}

Comments

Little corrections. Subsection 8.1 is completely rewritten

R2 v1 2026-06-23T13:32:54.837Z