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The Global ETD Search service is a free service for researchers
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Showing 1 to 3 of 3 (0.045 seconds)Spelling suggestions: "subject:"bivariant atheory"" "subject:"bivariant astheory""
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Monoidal equivalence of locally compact quantum groups and application to bivariant K-theory / Equivalence monoïdale de groupes quantiques localement compacts et application à la K-théorie bivarianteCrespo, Jonathan 20 November 2015 (has links)
Les travaux présentés dans cette thèse concernent l'équivalence monoïdale de groupes quantiques localement compacts et ses applications. Nous généralisons au cas localement compact et régulier, deux résultats importants concernant les actions de groupes quantiques compacts. Soient G1 et G2 deux groupes quantiques localement compacts réguliers et monoïdalement équivalents. Nous développons un procédé d'induction des actions qui permet d'établir une équivalence canonique des catégories dont les objets sont les actions continues de G1 et G2 sur les C*-algèbres. Comme application de ce résultat, nous obtenons une équivalence canonique des catégories de KK-Théorie équivariante pour G1 et G2. Nous introduisons et étudions une notion d'actions sur les C*-algèbres, de groupoïdes quantiques mesurés sur une base finie. La preuve de la seconde équivalence s'appuie alors sur une version du théorème de bidualité de Takesaki-Takai pour les actions de groupoïdes quantiques mesurés sur une base finie. Enfin, nous terminons en définissant et étudiant une notion de modules hilbertiens équivariants pour des actions de groupoïdes quantiques mesurés sur une base finie. / This dissertation deals with the notion of monoidal equivalence of locally compact quantum groups and its applications. We generalize to the case of regular locally compact quantum groups, two important resultst concerning the actions of compact quantum groups. Let G1 and G2 be two regular locally compact quantum groups monoidally equivalent. We develop an induction procedure and we build an equivalence of the categories, whose objects are the continuous actions of G1 and G2 on C*-algebras. As an application of this result, we obtain a canonical equivalence of the categories of equivariant KK-theory for actions of G1 and G2. We introduce and investigate a notion of actions on C*-algebras of mesured quantum groupoids on a finite basis. The proof of the second equivalence relies on a version of the Takesaki-Takai duality theorem for continuous actions of measured quantum groupoids on a finite basis. We conclude by defining and studying a notion of equivariant Hilbert modules for actions of mesured quantum groupoids on a finite basis.
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Poincaré self-duality of A_θDuwenig, Anna 09 April 2020 (has links)
The irrational rotation algebra A_θ is known to be Poincaré self-dual in the KK-theoretic sense. The spectral triple representing the required K-homology fundamental class was constructed by Connes out of the Dolbeault operator on the 2-torus, but
so far, there has not been an explicit description of the dual element. We geometrically construct, for certain elements g of the modular group, a finitely generated
projective module L_g over A_θ ⊗ A_θ out of a pair of transverse Kronecker flows on
the 2-torus. For upper triangular g, we find an unbounded cycle representing the
dual of said module under Kasparov product with Connes' class, and prove that this
cycle is invertible in KK(A_θ,A_θ), allowing us to 'untwist' L_g to an unbounded cycle
representing the unit for the self-duality of A_θ. / Graduate
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A classification of localizing subcategories by relative homological algebraNadareishvili, George 16 October 2015 (has links)
No description available.
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