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Your search keyword '"KALISZEWSKI, S."' showing total 13 results
Start Over Author "KALISZEWSKI, S." Publisher cambridge university press
13 results on '"KALISZEWSKI, S."'

1. TENSOR-PRODUCT COACTION FUNCTORS.

Author

KALISZEWSKI, S., LANDSTAD, MAGNUS B., and QUIGG, JOHN

Subjects
*K-theory, *TENSOR products, *LOGICAL prediction, *MATHEMATICS
Abstract

Recent work by Baum et al. ['Expanders, exact crossed products, and the Baum–Connes conjecture', Ann. K-Theory 1(2) (2016), 155–208], further developed by Buss et al. ['Exotic crossed products and the Baum–Connes conjecture', J. reine angew. Math. 740 (2018), 111–159], introduced a crossed-product functor that involves tensoring an action with a fixed action $(C,\unicode[STIX]{x1D6FE})$ , then forming the image inside the crossed product of the maximal-tensor-product action. For discrete groups, we give an analogue for coaction functors. We prove that composing our tensor-product coaction functor with the full crossed product of an action reproduces their tensor-crossed-product functor. We prove that every such tensor-product coaction functor is exact, and if $(C,\unicode[STIX]{x1D6FE})$ is the action by translation on $\ell ^{\infty }(G)$ , we prove that the associated tensor-product coaction functor is minimal, thereby recovering the analogous result by the above authors. Finally, we discuss the connection with the $E$ -ization functor we defined earlier, where $E$ is a large ideal of $B(G)$. [ABSTRACT FROM AUTHOR]

Published
2022
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2. Subgroup Correspondences.

Author

Kaliszewski, S., Larsen, Nadia S., and Quigg, John

Abstract

For a closed subgroup of a locally compact group the Rieffel induction process gives rise to a C *-correspondence over the C *-algebra of the subgroup. We study the associated Cuntz–Pimsner algebra and show that, by varying the subgroup to be open, compact, or discrete, there are connections with the Exel–Pardo correspondence arising from a cocycle, and also with graph algebras. [ABSTRACT FROM AUTHOR]

Published
2018
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3. DUALITIES FOR MAXIMAL COACTIONS.

Author

KALISZEWSKI, S., OMLAND, TRON, and QUIGG, JOHN

Subjects
*DUALITY theory (Mathematics), *CROSSED products of algebras, *FIXED point theory, *HOMOMORPHISMS, *MATHEMATICAL equivalence, *DYNAMICAL systems
Abstract

We present a new construction of crossed-product duality for maximal coactions that uses Fischer’s work on maximalizations. Given a group $G$ and a coaction $(A,\unicode[STIX]{x1D6FF})$ we define a generalized fixed-point algebra as a certain subalgebra of $M(A\rtimes _{\unicode[STIX]{x1D6FF}}G\rtimes _{\,\widehat{\unicode[STIX]{x1D6FF}}}G)$, and recover the coaction via this double crossed product. Our goal is to formulate this duality in a category-theoretic context, and one advantage of our construction is that it breaks down into parts that are easy to handle in this regard. We first explain this for the category of nondegenerate *-homomorphisms and then, analogously, for the category of $C^{\ast }$-correspondences. Also, we outline partial results for the ‘outer’ category, which has been studied previously by the authors. [ABSTRACT FROM AUTHOR]

Published
2017
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4. Topological realizations and fundamental groups of higher-rank graphs.

Author

Kaliszewski, S., Kumjian, Alex, Quigg, John, and Sims, Aidan

Abstract

We investigate topological realizations of higher-rank graphs. We show that the fundamental group of a higher-rank graph coincides with the fundamental group of its topological realization. We also show that topological realization of higher-rank graphs is a functor and that for each higher-rank graph Λ, this functor determines a category equivalence between the category of coverings of Λ and the category of coverings of its topological realization. We discuss how topological realization relates to two standard constructions for k-graphs: projective limits and crossed products by finitely generated free abelian groups. [ABSTRACT FROM PUBLISHER]

Published
2016
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5. OBSTRUCTIONS TO A GENERAL CHARACTERIZATION OF GRAPH CORRESPONDENCES.

Author

KALISZEWSKI, S., PATANI, NURA, and QUIGG, JOHN

Subjects
*COMPUTATIONAL mathematics, *ISOMORPHISM (Mathematics), *GRAPHIC methods, *TOPOLOGICAL graph theory, *SCIENCE
Abstract

For a countable discrete space $V$, every nondegenerate separable ${C}^{\ast } $-correspondence over ${c}_{0} (V)$ is isomorphic to one coming from a directed graph with vertex set $V$. In this paper we demonstrate why the analogous characterizations fail to hold for higher-rank graphs (where one considers product systems of ${C}^{\ast } $-correspondences) and for topological graphs (where $V$ is locally compact Hausdorff), and we discuss the obstructions that arise. [ABSTRACT FROM PUBLISHER]

Published
2013
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6. FELL BUNDLES AND IMPRIMITIVITY THEOREMS: MANSFIELD’S AND FELL’S THEOREMS.

Author

KALISZEWSKI, S., MUHLY, PAUL S., QUIGG, JOHN, and WILLIAMS, DANA P.

Subjects
*GROUPOIDS, *MATHEMATICAL transformations, *MATHEMATICS theorems, *AUTOMORPHISMS, *EQUIVALENCE classes (Set theory)
Abstract

In the third and latest paper in this series, we recover the imprimitivity theorems of Mansfield and Fell using our technique of Fell bundles over groupoids. Also, we apply the Rieffel surjection of the first paper in the series to relate our version of Mansfield’s theorem to that of an Huef and Raeburn, and to give an automatic amenability result for certain transformation Fell bundles. [ABSTRACT FROM PUBLISHER]

Published
2013
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7. A crossed-product approach to the Cuntz–Li algebras.

Author

Kaliszewski, S., Landstad, Magnus B., and Quigg, John

Subjects
C*-algebras, ADELES (Mathematics), MATHEMATICAL analysis, ISOMORPHISM (Mathematics), CROSS product (Mathematics), HOMOMORPHISMS, MATHEMATICS theorems
Abstract

Cuntz and Li have defined a C*-algebra associated to any integral domain, using generators and relations, and proved that it is simple and purely infinite and that it is stably isomorphic to a crossed product of a commutative C*-algebra. We give an approach to a class of C*-algebras containing those studied by Cuntz and Li, using the general theory of C*-dynamical systems associated to certain semidirect product groups. Even for the special case of the Cuntz–Li algebras, our development is new. [ABSTRACT FROM AUTHOR]

Published
2012
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