Virtual groups 45 years later

Moore, Calvin C.

doi:10.1090/conm/449/08716

Cited by 2 publications

(1 citation statement)

References 114 publications

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“…This action is called the Mackey range of the Radon-Nikodym cocycle [Ma66]. It has also been called the Poincaré flow [FM77] and the Radon-Nikodym flow [Mo08].…”

Section: The Maharam Extensionmentioning

confidence: 99%

Pointwise ergodic theorems beyond amenable groups

Bowen

Nevo

2012

Ergod. Th. Dynam. Sys.

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We prove pointwise and maximal ergodic theorems for probability measure preserving (p.m.p.) actions of any countable group, provided it admits an essentially free, weakly mixing amenable action of stable type III 1 . We show that this class contains all irreducible lattices in connected semisimple Lie groups without compact factors. We also establish similar results when the stable type is III λ , 0 < λ < 1, under a suitable hypothesis.Our approach is based on the following two principles. First, we show that it is possible to generalize the ergodic theory of p.m.p. actions of amenable groups to include p.m.p. amenable equivalence relations. Second, we show that it is possible to reduce the proof of ergodic theorems for p.m.p. actions of a general group to the proof of ergodic theorems in an associated p.m.p. amenable equivalence relation, provided the group admits an amenable action with the properties stated above.

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“…This action is called the Mackey range of the Radon-Nikodym cocycle [Ma66]. It has also been called the Poincaré flow [FM77] and the Radon-Nikodym flow [Mo08].…”

Section: The Maharam Extensionmentioning

confidence: 99%

Pointwise ergodic theorems beyond amenable groups

Bowen

Nevo

2012

Ergod. Th. Dynam. Sys.

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The Haagerup Property for Discrete Measured Groupoids

Anantharaman-Delaroche¹

2013

Springer Proceedings in Mathematics &Amp; Statistics

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International audienceWe define the Haagerup property in the general context of countable groupoids equipped with a quasi-invariant measure. One of our objectives is to complete an article of Jolissaint devoted to the study of this property for probability measure preserving countable equivalence relations. Our second goal, concerning the general situation, is to provide a definition of this property in purely geometric terms, whereas this notion had been introduced by Ueda in terms of the associated inclusion of von Neumann algebras. Our equivalent definition makes obvious the fact that treeability implies the Haagerup property for such groupoids and that it is not compatible with Kazhdan property (T)

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Virtual groups 45 years later

Cited by 2 publications

References 114 publications

Pointwise ergodic theorems beyond amenable groups

Pointwise ergodic theorems beyond amenable groups

The Haagerup Property for Discrete Measured Groupoids

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