Nonsingular Poisson Suspensions
Abstract
The classical Poisson functor associates to every infinite measure preserving dynamical system a probability preserving dynamical system called the Poisson suspension of . In this paper we generalize this construction: a subgroup Aut of -nonsingular transformations of is specified as the largest subgroup for which is -nonsingular. Topological structure of this subgroup is studied. We show that a generic element in Aut is ergodic and of Krieger type III. Let be a locally compact Polish group and let be a -action. We investigate dynamical properties of the Poisson suspension of in terms of an affine representation of associated naturally with . It is shown that has property (T) if and only if each nonsingular Poisson -action admits an absolutely continuous invariant probability. If does not have property then for each generating probability on and , a nonsingular Poisson -action is constructed whose Furstenberg -entropy is .
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