The Topological Structure of Polish Groups and Groupoids of Measure Space Transformations

Danilenko, Alexandre I.

doi:10.2977/prims/1195163723

Cited by 19 publications

(10 citation statements)

References 15 publications

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“…(R r , m) . Moreover, this topology coincides with the Polish topology on AutRp which was considered by T. Hamachi and M. Osikawa [HO] (see [Dan,section 3]).…”

Section: Introductionsupporting

confidence: 56%

Outer Automorphism Group of the Ergodic Equivalence Relation Generated by Translations of Dense Subgroup of Compact Group on its Homogeneous Space

Gefter

1996

Publ. Res. Inst. Math. Sci.

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We study the outer automorphism group OutRr of the ergodic equivalence relation Rr generated by the action of a lattice F in a semisimple Lie group on the homogeneos space of a compact group K. It is shown that OutRr is locally compact. If K is a connected simple Lie group, we prove the compactness of 0\itR r using the D. Witte's rigidity theorem. Moreover, an example of an equivalence relation without outer automorphisms is constructed.

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“…(R r , m) . Moreover, this topology coincides with the Polish topology on AutRp which was considered by T. Hamachi and M. Osikawa [HO] (see [Dan,section 3]).…”

Section: Introductionsupporting

confidence: 56%

Outer Automorphism Group of the Ergodic Equivalence Relation Generated by Translations of Dense Subgroup of Compact Group on its Homogeneous Space

Gefter

1996

Publ. Res. Inst. Math. Sci.

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“…IX, Theorem 7.3]. Currently many big Polish groups are known to be homeomorphic to 2 . Examples include Aut(X, µ) with the weak topology (Nhu [24]), the group of orientation-preserving homeomorphisms of the unit interval (Anderson), the isometry group of the Urysohn space (Melleray [22]), and many others.…”

Section: Full Groups Are Homeomorphic Tomentioning

confidence: 99%

“…the set {x ∈ X : T x = x}. 2 Identifying the topological type of big symmetry groups has been an ongoing enterprise for the last few decades. During that time, infinite-dimensional topology has developed many tools which allow us to do that.…”

Section: Topological Properties Of Full Groups 529mentioning

confidence: 99%

Topological properties of full groups

Kittrell

Tsankov

2009

Ergod. Th. Dynam. Sys.

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Abstract. We study full groups of countable, measure-preserving equivalence relations. Our main results include that they are all homeomorphic to the separable Hilbert space and that every homomorphism from an ergodic full group to a separable group is continuous. We also find bounds for the minimal number of topological generators (elements generating a dense subgroup) of full groups allowing us to distinguish between full groups of equivalence relations generated by free, ergodic actions of the free groups F m and F n if m and n are sufficiently far apart. We also show that an ergodic equivalence relation is generated by an action of a finitely generated group if an only if its full group is topologically finitely generated.

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“…Full groups of type III ergodic automorphisms are contractible, as was shown by Danilenko in [Dan95]. Besides, Eigen ([Eig81]) has proved that they are simple.…”

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confidence: 84%

Connected Polish groups with ample generics

Kaïchouh

Maître²

2015

Bulletin of the London Mathematical Society

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In this paper, we give the first examples of connected Polish groups that have ample generics, answering a question of Kechris and Rosendal. We show that any Polish group with ample generics embeds into a connected Polish group with ample generics and that full groups of type III hyperfinite ergodic equivalence relations have ample generics. We also sketch a proof of the following result: the full group of any type III ergodic equivalence relation has topological rank 2.

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The Topological Structure of Polish Groups and Groupoids of Measure Space Transformations

Cited by 19 publications

References 15 publications

Outer Automorphism Group of the Ergodic Equivalence Relation Generated by Translations of Dense Subgroup of Compact Group on its Homogeneous Space

Outer Automorphism Group of the Ergodic Equivalence Relation Generated by Translations of Dense Subgroup of Compact Group on its Homogeneous Space

Topological properties of full groups

Connected Polish groups with ample generics

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