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The Global ETD Search service is a free service for researchers to find electronic theses and dissertations. This service is provided by the Networked Digital Library of Theses and Dissertations.
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1	A Non-commutative -algebra of Borel Functions Hart, Robert* 05 September 2012 (has links) To the pair (E,c), where E is a countable Borel equivalence relation on a standard Borel space (X,A) and c a normalized Borel T-valued 2-cocycle on E, we associate a sequentially weakly closed Borel -algebra Br(E,c), contained in the bounded linear operators on L^2(E). Associated to Br(E,c) is a natural (Borel) Cartan subalgebra (Definition 6.4.10) L(Bo(X)) isomorphic to the bounded Borel functions on X. Then L(Bo(X)) and its normalizer (the set of the unitaries u in Br(E,c) such that ufu in L(Bo(X)), f in L(Bo(X))) countably generates the Borel -algebra Br(E,c). In this thesis, we study Br(E,c) and in particular prove that: i) If E is smooth, then Br(E,c) is a type I Borel -algebra (Definition 6.3.10). ii) If E is a hyperfinite, then Br(E,c) is a Borel AF-algebra (Definition 7.5.1). iii) Generalizing Kumjian's definition, we define a Borel twist G over E and its associated sequentially closed Borel -algebra Br(G). iv) Let a Borel Cartan pair (B, Bo) denote a sequentially closed Borel -algebra B with a Borel Cartan subalgebra Bo, where B is countably Bo-generated. Generalizing Feldman-Moore's result, we prove that any pair (B, Bo) can be realized uniquely as a pair (Br(E,c), L(Bo(X))). Moreover, we show that the pair (Br(E,c), L(Bo(X))) is a complete invariant of the countable Borel equivalence relation E. v) We prove a Krieger type theorem, by showing that two aperiodic hyperfinite countable equivalence relations are isomorphic if and only if their associated Borel -algebras Br(E1) and Br(E2) are isomorphic. Borel equivalence relations Borel -algebras Borel dynamical systems operator algebras dynamical systems
2	A Non-commutative -algebra of Borel Functions Hart, Robert* 05 September 2012 (has links) To the pair (E,c), where E is a countable Borel equivalence relation on a standard Borel space (X,A) and c a normalized Borel T-valued 2-cocycle on E, we associate a sequentially weakly closed Borel -algebra Br(E,c), contained in the bounded linear operators on L^2(E). Associated to Br(E,c) is a natural (Borel) Cartan subalgebra (Definition 6.4.10) L(Bo(X)) isomorphic to the bounded Borel functions on X. Then L(Bo(X)) and its normalizer (the set of the unitaries u in Br(E,c) such that ufu in L(Bo(X)), f in L(Bo(X))) countably generates the Borel -algebra Br(E,c). In this thesis, we study Br(E,c) and in particular prove that: i) If E is smooth, then Br(E,c) is a type I Borel -algebra (Definition 6.3.10). ii) If E is a hyperfinite, then Br(E,c) is a Borel AF-algebra (Definition 7.5.1). iii) Generalizing Kumjian's definition, we define a Borel twist G over E and its associated sequentially closed Borel -algebra Br(G). iv) Let a Borel Cartan pair (B, Bo) denote a sequentially closed Borel -algebra B with a Borel Cartan subalgebra Bo, where B is countably Bo-generated. Generalizing Feldman-Moore's result, we prove that any pair (B, Bo) can be realized uniquely as a pair (Br(E,c), L(Bo(X))). Moreover, we show that the pair (Br(E,c), L(Bo(X))) is a complete invariant of the countable Borel equivalence relation E. v) We prove a Krieger type theorem, by showing that two aperiodic hyperfinite countable equivalence relations are isomorphic if and only if their associated Borel -algebras Br(E1) and Br(E2) are isomorphic. Borel equivalence relations Borel -algebras Borel dynamical systems operator algebras dynamical systems
3	A Non-commutative -algebra of Borel Functions Hart, Robert* January 2012 (has links) To the pair (E,c), where E is a countable Borel equivalence relation on a standard Borel space (X,A) and c a normalized Borel T-valued 2-cocycle on E, we associate a sequentially weakly closed Borel -algebra Br(E,c), contained in the bounded linear operators on L^2(E). Associated to Br(E,c) is a natural (Borel) Cartan subalgebra (Definition 6.4.10) L(Bo(X)) isomorphic to the bounded Borel functions on X. Then L(Bo(X)) and its normalizer (the set of the unitaries u in Br(E,c) such that ufu in L(Bo(X)), f in L(Bo(X))) countably generates the Borel -algebra Br(E,c). In this thesis, we study Br(E,c) and in particular prove that: i) If E is smooth, then Br(E,c) is a type I Borel -algebra (Definition 6.3.10). ii) If E is a hyperfinite, then Br(E,c) is a Borel AF-algebra (Definition 7.5.1). iii) Generalizing Kumjian's definition, we define a Borel twist G over E and its associated sequentially closed Borel -algebra Br(G). iv) Let a Borel Cartan pair (B, Bo) denote a sequentially closed Borel -algebra B with a Borel Cartan subalgebra Bo, where B is countably Bo-generated. Generalizing Feldman-Moore's result, we prove that any pair (B, Bo) can be realized uniquely as a pair (Br(E,c), L(Bo(X))). Moreover, we show that the pair (Br(E,c), L(Bo(X))) is a complete invariant of the countable Borel equivalence relation E. v) We prove a Krieger type theorem, by showing that two aperiodic hyperfinite countable equivalence relations are isomorphic if and only if their associated Borel -algebras Br(E1) and Br(E2) are isomorphic. Borel equivalence relations Borel -algebras Borel dynamical systems operator algebras dynamical systems

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