Your search keyword '"KALISZEWSKI, S."' showing total 28 results

1. Coactions on C*-algebras and universal properties

Author

Bédos, Erik, Kaliszewski, S., Quigg, John, and Turk, Jonathan

Subjects

FOS: Mathematics, Mathematics - Operator Algebras, Operator Algebras (math.OA), 46L05 (Primary), 46L55 (Secondary)

Abstract

It is well-known that the maximalization of a coaction of a locally compact group on a C*-algebra enjoys a universal property. We show how this important property can be deduced from a categorical framework by exploiting certain properties of the maximalization functor for coactions. We also provide a dual proof for the universal property of normalization of coactions., 17 pages

Published

2022

2. Pedersen rigidity for coactions of compact groups

Author

Kaliszewski, S., Omland, Tron, Quigg, John, and Turk, Jonathan

Subjects

Mathematics - Operator Algebras, FOS: Mathematics, Operator Algebras (math.OA), 46L05 (Primary), 46L55 (Secondary)

Abstract

We prove a two-way version of Pedersen's outer conjugacy theorem for coactions of compact groups, and in this case characterizing outer conjugate coactions of a compact group in terms of properties of the dual actions. We use this to prove a ``no-go theorem'' for coactions of compact groups: every conjugacy of the dual actions comes from a unique outer conjugacy of the coactions. We parlay this into a category equivalence., Comment: 12 pages. Corrected misspelling in title

Published

2022

3. Gauge-invariant uniqueness theorems for $P$-graphs

Author

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

Subjects

Mathematics - Operator Algebras, FOS: Mathematics, Operator Algebras (math.OA), Primary 46L05

Abstract

We prove a version of the result in the title that makes use of maximal coactions in the context of discrete groups. Earlier Gauge-Invariant Uniqueness theorems for $C^*$-algebras associated to $P$-graphs and similar $C^*$-algebras exploited a property of coactions known as normality. In the present paper, the view point is that maximal coactions provide a more natural starting point to state and prove such uniqueness theorems. A byproduct of our approach consists of an abstract characterization of co-universal representations for a Fell bundle over a discrete group., Comment: 10 pages

Published

2022

4. Tensor $D$ coaction functors

Author

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

Subjects

Mathematics::Operator Algebras, Mathematics::K-Theory and Homology, Mathematics::Category Theory, FOS: Mathematics, Mathematics - Operator Algebras, 46L55(Primary)46M15 (Secondary), Operator Algebras (math.OA), Mathematics::Algebraic Topology

Abstract

We develop an approach, using what we call "tensor $D$ coaction functors", to the "$C$-crossed-product" functors of Baum, Guentner, and Willett. We prove that the tensor $D$ functors are exact, and identify the minimal such functor. This continues our program of applying coaction functors as a tool in the Baum-Guentner-Willett-Buss-Echterhoff campaign to attempt to "fix" the Baum-Connes conjecture., Error in Corollary 3.5, which was needed in the main result Theorem 4.14

Published

2021

5. Groupoid Semidirect Product Fell Bundles I- Actions by Isomorphisms

Author

Hall, Lucas, Kaliszewski, S., Quigg, John, and Williams, Dana P.

Subjects

Mathematics::Algebraic Geometry, Mathematics::Operator Algebras, Mathematics::Category Theory, FOS: Mathematics, Mathematics - Operator Algebras, Mathematics::General Topology, Operator Algebras (math.OA), Mathematics::Symplectic Geometry

Abstract

Given an action of a groupoid by isomorphisms on a Fell bundle (over another groupoid), we form a semidirect-product Fell bundle, and prove that its $C^{*}$-algebra is isomorphic to a crossed product., 29 pages. Minor Expository Revisions

Published

2021

6. Groupoid Semidirect Product Fell Bundles II- Principal Actions and Stabilization

Author

Hall, Lucas, Kaliszewski, S., Quigg, John, and Williams, Dana P.

Subjects

Mathematics::Operator Algebras, Mathematics::Category Theory, Mathematics - Operator Algebras, FOS: Mathematics, Operator Algebras (math.OA), Mathematics::Symplectic Geometry

Abstract

Given a free and proper action of a groupoid on a Fell bundle (over another groupoid), we give an equivalence between the semidirect-product and the generalized-fixed-point Fell bundles, generalizing an earlier result where the action was by a group. As an application, we show that the Stabilization Theorem for Fell bundles over groupoids is essentially another form of crossed-product duality., Comment: 26 pages. Minor revisions to clarify exposition

Published

2021

7. R-coactions on $C^*$-algebras

Author

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

Subjects

46L55 (Primary) 46M15 (Secondary), Mathematics::Operator Algebras, Mathematics::Quantum Algebra, Mathematics::Rings and Algebras, Mathematics - Operator Algebras, FOS: Mathematics, Operator Algebras (math.OA)

Abstract

We give the beginnings of the development of a theory of what we call "R-coactions" of a locally compact group on a $C^*$-algebra. These are the coactions taking values in the maximal tensor product, as originally proposed by Raeburn. We show that the theory has some gaps as compared to the more familiar theory of standard coactions. However, we indicate how we needed to develop some of the basic properties of R-coactions as a tool in our program involving the use of coaction functors in the study of the Baum-Connes conjecture.

Published

2021

8. Skew products of finitely aligned left cancellative small categories and Cuntz-Krieger algebras

Author

Bédos, Erik, Kaliszewski, S., Quigg, John, and Universitäts- und Landesbibliothek Münster

Subjects

510 Mathematics, Mathematics::K-Theory and Homology, Mathematics::Operator Algebras, Mathematics::Category Theory, FOS: Mathematics, Mathematics - Operator Algebras, 46L05, 46L55, ddc:510, Operator Algebras (math.OA), Mathematics

Abstract

Given a group cocycle on a finitely aligned left cancellative small category (LCSC) we investigate the associated skew product category and its Cuntz-Krieger algebra, which we describe as the crossed product of the Cuntz-Krieger algebra of the original category by an induced coaction of the group. We use our results to study Cuntz-Krieger algebras arising from free actions of groups on finitely aligned LCSC's, and to construct coactions of groups on Exel-Pardo algebras. Finally we discuss the universal group of a small category and connectedness of skew product categories., 47 pages. Some more typos corrected. This version matches the published version

Published

2019

9. On finitely aligned left cancellative small categories, Zappa-Sz��p products and Exel-Pardo algebras

Author

B��dos, Erik, Kaliszewski, S., Quigg, John, and Spielberg, Jack

Subjects

Mathematics::Operator Algebras, Mathematics::Category Theory, FOS: Mathematics, 46L05, 46L55, Operator Algebras (math.OA)

Abstract

We consider Toeplitz and Cuntz-Krieger $C^*$-algebras associated with finitely aligned left cancellative small categories. We pay special attention to the case where such a category arises as the Zappa-Sz��p product of a category and a group linked by a one-cocycle. As our main application, we obtain a new approach to Exel-Pardo algebras in the case of row-finite graphs. We also present some other ways of constructing $C^*$-algebras from left cancellative small categories and discuss their relationship., 60 pages. Sections 3 and 4 have been switched, and a remark (Remark 4.2) has been added, as suggested by the referees

Published

2017

10. On Exel-Pardo algebras

Author

B��dos, Erik, Kaliszewski, S., and Quigg, John

Subjects

Mathematics::K-Theory and Homology, Mathematics::Operator Algebras, FOS: Mathematics, Mathematics - Operator Algebras, 46L55 (Primary), 46L08 (Secondary), Operator Algebras (math.OA)

Abstract

We generalize a recent construction of Exel and Pardo, from discrete groups acting on finite directed graphs to locally compact groups acting on topological graphs. To each cocycle for such an action, we construct a $C^*$-correspondence whose associated Cuntz-Pimsner algebra is the analog of the Exel-Pardo $C^*$-algebra., minor corrections

Published

2015

11. Destabilization

Author

Kaliszewski, S., Omland, Tron, and Quigg, John

Subjects

Mathematics::Category Theory, FOS: Mathematics, Operator Algebras (math.OA), 46L05 (Primary), Secondary 46L06, 46L08, 46M15

Abstract

This partly expository paper first supplies the details of a method of factoring a stable C*-algebra A as B \otimes K in a canonical way. Then it is shown that this method can be put into a categorical framework, much like the crossed-product dualities, and that stabilization gives rise to an equivalence between the nondegenerate category of C*-algebras and a category of "K-algebras". We consider this equivalence as "inverting" the stabilization process, that is, a "destabilization". Furthermore, the method of factoring stable C*-algebras generalizes to Hilbert bimodules, and an analogous category equivalence between the associated enchilada categories is produced, giving a destabilization for C*-correspondences. Finally, we make a connection with (double) crossed-product duality., minor revisions

Published

2015

12. A new look at crossed product correspondences and associated C*-algebras

Author

B��dos, Erik, Kaliszewski, S., Quigg, John, and Robertson, David

Subjects

Mathematics::K-Theory and Homology, Mathematics::Operator Algebras, FOS: Mathematics, Mathematics - Operator Algebras, Operator Algebras (math.OA), 46L06, 46L08, 46L55 (Primary)

Abstract

When a locally compact group acts on a C*-correspondence, it also acts on the associated Cuntz-Pimsner algebra in a natural way. Hao and Ng have shown that when the group is amenable the Cuntz-Pimsner algebra of the crossed product correspondence is isomorphic to the crossed product of the Cuntz-Pimsner algebra. In this paper, we have a closer look at this isomorphism in the case where the group is not necessarily amenable. We also consider what happens at the level of Toeplitz algebras., 24 pages

Published

2014

13. Categorical perspectives in noncommutative duality

Author

Kaliszewski, S. and Quigg, John

Subjects

46L05, Mathematics::Operator Algebras, FOS: Mathematics, Mathematics - Operator Algebras, Operator Algebras (math.OA)

Abstract

Noncommutative duality for C*-dynamical systems is a vast generalization of Pontryagin duality for locally compact abelian groups. In this series of lectures, we give an introduction to the categorical aspects of this duality, focusing primarily on Landstad duality for actions and coactions of locally compact groups., These notes were written to accompany a mini-course given by the authors at the summer school on C*-algebras and their interplay with dynamical systems held at the Sophus Lie Conference Center in Nordfjordeid, Norway, in June 2010

Published

2012

14. Coactions and skew products for topological graphs

Author

Kaliszewski, S. and Quigg, John

Subjects

Mathematics::Operator Algebras, Mathematics::Quantum Algebra, 46L05 (Primary) 46L55 (Secondary), ComputingMethodologies_SYMBOLICANDALGEBRAICMANIPULATION, FOS: Mathematics, Mathematics - Operator Algebras, Operator Algebras (math.OA), MathematicsofComputing_DISCRETEMATHEMATICS

Abstract

The C*-algebra of a skew-product topological graph is a crossed product of the C*-algebra of the base topological graph by a coaction., minor corrections

Published

2012

15. Fell bundles and imprimitivity theorems

Author

Kaliszewski, S., Muhly, Paul S., Quigg, John, and Williams, Dana P.

Subjects

46L55 (Primary) 46M15, 18A25 (Secondary), Mathematics::Operator Algebras, Mathematics::Category Theory, FOS: Mathematics, Mathematics - Operator Algebras, Operator Algebras (math.OA), Mathematics::Symplectic Geometry

Abstract

Our goal in this paper and two sequels is to apply the Yamagami-Muhly-Williams equivalence theorem for Fell bundles over groupoids to recover and extend all known imprimitivity theorems involving groups. Here we extend Raeburn's symmetric imprimitivity theorem, and also, in an appendix, we develop a number of tools for the theory of Fell bundles that have not previously appeared in the literature., minor changes

Published

2012

16. Fell bundles and imprimitivity theorems: Mansfield's and Fell's theorems

Author

Kaliszewski, S., Muhly, Paul S., Quigg, John, and Williams, Dana P.

Subjects

Mathematics::Operator Algebras, Mathematics - Operator Algebras, FOS: Mathematics, Mathematics::General Topology, Operator Algebras (math.OA), 46L55 (primary), 46M15, 18A25 (secondary)

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., Comment: updated references

Published

2012

17. Cuntz-Li algebras from a-adic numbers

Author

Kaliszewski, S., Omland, Tron, and Quigg, John

Subjects

Mathematics::Group Theory, 46L05, 46L55 (Primary) 11R04, 11R56, 11S82 (Secondary), Mathematics::Operator Algebras, Mathematics - Operator Algebras, FOS: Mathematics, Operator Algebras (math.OA)

Abstract

The a-adic numbers are those groups that arise as Hausdorff completions of noncyclic subgroups of the rational numbers. We give a crossed product construction of (stabilized) Cuntz-Li algebras coming from the a-adic numbers and investigate the structure of the associated algebras. In particular, these algebras are in many cases Kirchberg algebras in the UCT class. Moreover, we prove an a-adic duality theorem, which links a Cuntz-Li algebra with a corresponding dynamical system on the real numbers. The paper also contains an appendix where a nonabelian version of the "subgroup of dual group theorem" is given in the setting of coactions., Comment: 41 pages; revised version

Published

2012

18. Functoriality of Cuntz-Pimsner correspondence maps

Author

Kaliszewski, S., Quigg, John, and Robertson, David

Subjects

Mathematics::K-Theory and Homology, Mathematics::Operator Algebras, Mathematics::Category Theory, Mathematics - Operator Algebras, FOS: Mathematics, Operator Algebras (math.OA), 46L08

Abstract

We show that the passage from a $C^\ast$-correspondence to its Cuntz-Pimsner $C^\ast$-algebra gives a functor on a category of $C^\ast$-correspondences with appropriately defined morphisms. Applications involving topological graph $C^\ast$-algebras are discussed, and an application to crossed-product correspondences is presented in detail., Comment: 16 pages

Published

2012

19. Inner coactions, Fell bundles, and abstract uniqueness theorems

Author

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

Subjects

Mathematics::Operator Algebras, Mathematics - Operator Algebras, FOS: Mathematics, Operator Algebras (math.OA)

Abstract

We prove gauge-invariant uniqueness theorems with respect to maximal and normal coactions for $C^*$-algebras associated to product systems of $C^*$-correspondences. Our techniques of proof are developed in the abstract context of Fell bundles. We employ inner coactions to prove an essential-inner uniqueness theorem for Fell bundles. As application, we characterise injectivity of homomorphisms on Nica's Toeplitz algebra $\Tt(G, P)$ of a quasi-lattice ordered group $(G, P)$ in the presence of a finite non-trivial set of lower bounds for all non-trivial elements in $P$., Comment: New Remark 6.7, new Corollaries 6.8 and 6.9. To appear in M\"unster Journal of Mathematics

Published

2011

20. A crossed-product approach to the Cuntz-Li algebras

Author

Kaliszewski, S., Landstad, M., and Quigg, John

Subjects

Mathematics::Operator Algebras, FOS: Mathematics, Mathematics - Operator Algebras, 46L55, 46L05 (Primary), 11R04, 11R56 (Secondary), Operator Algebras (math.OA)

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., Major revision and rearrangement; split Section 6 in order to use the generators and relations from Section 9 in a better way

Published

2010

21. Coactions and Fell bundles

Author

Kaliszewski, S., Muhly, Paul S., Quigg, John, and Williams, Dana P.

Subjects

Mathematics - Functional Analysis, FOS: Mathematics, Mathematics - Operator Algebras, 46L55, 46L05, Operator Algebras (math.OA), Functional Analysis (math.FA)

Abstract

We show that if $\AA$ is a Fell bundle over a locally compact group $G$, then there is a natural coaction $\delta$ of $G$ on the Fell-bundle $C^*$-algebra $C^*(G,\AA)$ such that if $\hat{\delta}$ is the dual action of $G$ on the crossed product $C^*(G,\AA) \rtimes_{\delta} G$, then the full crossed product $(C^*(G,\AA) \rtimes_{\delta}G)\rtimes_{\hat{\delta}}G$ is canonically isomorphic to $C^*(G,\AA) \otimes\KK(L^2(G))$. Hence the coaction $\delta$ is maximal., Comment: 39 Pages

Published

2009

22. Naturality of Rieffel's Morita equivalence for proper actions

Author

Huef, Astrid an, Kaliszewski, S., Raeburn, Iain, and Williams, Dana P.

Subjects

Mathematics::K-Theory and Homology, Mathematics::Operator Algebras, Mathematics::Category Theory, 46L55, FOS: Mathematics, Mathematics - Operator Algebras, Operator Algebras (math.OA)

Abstract

Suppose that a locally compact group $G$ acts freely and properly on the right of a locally compact space $T$. Rieffel proved that if $\alpha$ is an action of $G$ on a $C^*$-algebra $A$ and there is an equivariant embedding of $C_0(T)$ in $M(A)$, then the action $\alpha$ of $G$ on $A$ is proper, and the crossed product $A\rtimes_{\alpha,r}G$ is Morita equivalent to a generalised fixed-point algebra $\Fix(A,\alpha)$ in $M(A)^\alpha$. We show that the assignment $(A,\alpha)\mapsto\Fix(A,\alpha)$ extends to a functor $\Fix$ on a category of $C^*$-dynamical systems in which the isomorphisms are Morita equivalences, and that Rieffel's Morita equivalence implements a natural isomorphism between a crossed-product functor and $\Fix$. From this, we deduce naturality of Mansfield imprimitivity for crossed products by coactions, improving results of Echterhoff-Kaliszewski-Quigg-Raeburn and Kaliszewski-Quigg Raeburn, and naturality of a Morita equivalence for graph algebras due to Kumjian and Pask.

Published

2008

23. Hecke C*-algebras and semidirect products

Author

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

Subjects

20C08, 46L55, Mathematics - Operator Algebras, FOS: Mathematics, Operator Algebras (math.OA)

Abstract

We analyze Hecke pairs (G,H) and the associated Hecke algebra when G is a semidirect product N x Q and H = M x R for subgroups M of N and R of Q with M normal in N. Conditions are given in terms of N, Q, M, and R which are equivalent to the Hecke condition on (G,H), and the Schlichting completion of (G,H) is identified in terms of completions of N, Q, M, and R. Our main result shows that (assuming (G,H) coincides with its Schlichting completion) when R is normal in Q, the closure of the Hecke algebra in C*(G) is Morita-Rieffel equivalent to a crossed product I x Q/R, where I is a certain ideal in the fixed-point algebra C*(N)^R. Several concrete examples are given illustrating and applying our techniques, including some involving subgroups of GL(2,K) acting on K^2, where K = Q or K = Z[1/p]., Comment: 27 pages. Minor revision

Published

2006

24. Mansfield's imprimitivity theorem for full crossed products

Author

Kaliszewski, S. and Quigg, John

Subjects

Mathematics::Operator Algebras, Mathematics::Category Theory, Mathematics::Quantum Algebra, 46L55, Mathematics::Rings and Algebras, Mathematics - Operator Algebras, FOS: Mathematics, Operator Algebras (math.OA)

Abstract

For any maximal coaction (A, G, delta) and any closed normal subgroup N of G, there exists an imprimitivity bimodule Y between the full crossed product A x G x N and A x G/N, together with a compatible coaction delta_Y of G. The assignment (A, delta) -> (Y, delta_Y) implements a natural equivalence between the crossed-product functors "x G x N" and "x G/N", in the category whose objects are maximal coactions of G and whose morphisms are isomorphism classes of right-Hilbert bimodule coactions of G., 22 pages

Published

2004

25. Hecke C*-algebras, Schlichting completions, and Morita equivalence

Author

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

Subjects

Mathematics - Operator Algebras, FOS: Mathematics, Operator Algebras (math.OA), 46L55 (Primary), 20C08 (Secondary)

Abstract

The Hecke algebra H(G,H) of a Hecke pair (G,H) is studied using the Schlichting completion (G',H'), which is a Hecke pair whose Hecke algebra is isomorphic to H(G,H) and which is topologized so that H' is a compact open subgroup of G'. In particular, the representation theory and C*-completions of H(G,H) are addressed in terms of the projection p in C*(G') corresponding to the characteristic function of H', using both Fell's and Rieffel's imprimitivity theorems and the identity H(G,H) = p C_c(G') p. An extended analysis of the case where H is contained in a normal subgroup of G (and in particular the case where G is a semidirect product) is carried out, and several specific examples are analyzed using this approach., Comment: 43 pages. Minor revision

Published

2003

26. Equivariance and Imprimitivity for Discrete Hopf C*-Coactions

Author

Kaliszewski, S. and Quigg, John

Subjects

Mathematics - Functional Analysis, Mathematics::Operator Algebras, Mathematics::Quantum Algebra, Mathematics::Rings and Algebras, Mathematics - Operator Algebras, FOS: Mathematics, Operator Algebras (math.OA), 46L55 (Primary) 22D25 (Secondary), Functional Analysis (math.FA)

Abstract

Let U, V, and W be multiplicative unitaries coming from discrete Kac systems such that W is an amenable normal submultiplicative unitary of V with quotient U. We define notions for right-Hilbert bimodules of coactions of S_V and (S_V)^, their restrictions to S_W and (S_U)^, their dual coactions, and their full and reduced crossed products. If N(A) denotes the imprimitivity bimodule associated to any coaction of S_V on a C*-algebra A by Ng's imprimitivity theorem, then for any suitably nondegenerate injective coaction of S_V on a right-Hilbert A - B bimodule X we establish an isomorphism between two tensor product bimodules involving N(A), N(B), and certain crossed products of X. This can be interpreted as a natural transformation between two crossed-product functors., Comment: LaTeX-2e, 19 pages, uses pb-diagram.sty. Propositions 4.1, 4.2, and Lemma 4.3 (which had a gap in its proof) have been replaced by a minor additional nondegeneracy hypothesis in Theorem 4.4 (now 4.1)

Published

1997

27. Crossed Products by Dual Coactions of Groups and Homogeneous Spaces

Author

Echterhoff, Siegfried, Kaliszewski, S., and Raeburn, Iain

Subjects

Mathematics - Functional Analysis, Mathematics::Operator Algebras, Mathematics::Quantum Algebra, Mathematics - Operator Algebras, FOS: Mathematics, Operator Algebras (math.OA), 46L55 (Primary) 22D25 (Secondary), Functional Analysis (math.FA)

Abstract

Mansfield showed how to induce representations of crossed products of C*-algebras by coactions from crossed products by quotient groups and proved an imprimitivity theorem characterising these induced representations. We give an alternative construction of his bimodule in the case of dual coactions, based on the symmetric imprimitivity theorem of the third author; this provides a more workable way of inducing representations of crossed products of C*-algebras by dual coactions. The construction works for homogeneous spaces as well as quotient groups, and we prove an imprimitivity theorem for these induced representations., Comment: LaTeX-2e, 19 pages, requires pb-diagram.sty ((E) University of Paderborn, Germany (K,R) University of Newcastle, Australia)

Published

1996

28. On reflective-coreflective equivalence and associated pairs

Author

Erik Bédos, Kaliszewski, S., and Quigg, J.

Subjects

Mathematics::Category Theory, Mathematics - Operator Algebras, FOS: Mathematics, Mathematics - Category Theory, Computer Science::Symbolic Computation, Category Theory (math.CT), Operator Algebras (math.OA), 18A40 (Primary) 46L55, 46L89 (Secondary)

Abstract

We show that a reflective/coreflective pair of full subcategories satisfies a "maximal-normal"-type equivalence if and only if it is an associated pair in the sense of Kelly and Lawvere., Comment: added section numbers