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CO-UNIVERSAL C*-ALGEBRAS ASSOCIATED TO APERIODIC k-GRAPHS

Published online by Cambridge University Press:  13 August 2013

SOORAN KANG
Affiliation:
Department of Mathematics and Statistics, University of Otago, PO Box 56, Dunedin 9054, New Zealand e-mail: [email protected]
AIDAN SIMS
Affiliation:
School of Mathematics and Applied Statistics, University of Wollongong, NSW 2522, Australia e-mail: [email protected]
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Abstract

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We construct a representation of each finitely aligned aperiodic k-graph Λ on the Hilbert space $\mathcal{H}^{\rm ap}$ with basis indexed by aperiodic boundary paths in Λ. We show that the canonical expectation on $\mathcal{B}(\mathcal{H}^{\rm ap})$ restricts to an expectation of the image of this representation onto the subalgebra spanned by the final projections of the generating partial isometries. We then show that every quotient of the Toeplitz algebra of the k-graph admits an expectation compatible with this one. Using this, we prove that the image of our representation, which is canonically isomorphic to the Cuntz–Krieger algebra, is co-universal for Toeplitz–Cuntz–Krieger families consisting of non-zero partial isometries.

Keywords

Type
Research Article
Copyright
Copyright © Glasgow Mathematical Journal Trust 2013 

References

REFERENCES

1.Bates, T., Pask, D., Raeburn, I. and Szymański, W., The C*-algebras of row-finite graphs, New York J. Math. 6 (2000), 307324.Google Scholar
2.Blackadar, B., Operator algebras (Springer, Berlin, 2006).CrossRefGoogle Scholar
3.Cuntz, J., Simple C*-algebras generated by isometries, Comm. Math. Phys. 57 (1977), 173185.Google Scholar
4.Farthing, C., Muhly, P. and Yeend, T., Higher-rank graph C*-algebras: An inverse semigroup and groupoid approach, Semigroup Forum 71 (2005), 159187.CrossRefGoogle Scholar
5.Fowler, N. J. and Sims, A., Product systems over right-angled Artin semigroups, Trans. Amer. Math. Soc. 354 (2002), 14871509.Google Scholar
6.Hong, J. H. and Szymański, W., The primitive ideal space of the C*-algebras of infinite graphs, J. Math. Soc. Japan 56 (2004), 4564.Google Scholar
7.Katsura, T., A class of C*-algebras generalizing both graph algebras and homeomorphism C*-algebras I. Fundamental results, Trans. Amer. Math. Soc. 356 (2004), 42874322.Google Scholar
8.Katsura, T., A class of C*-algebras generalizing both graph algebras and homeomorphism C*-algebras. III. Ideal structures, Ergodic Theory Dynam. Syst. 26 (2006), 18051854.Google Scholar
9.Katsura, T., Ideal structure of C*-algebras associated with C*-correspondences, Pacific J. Math. 230 (2007), 107146.CrossRefGoogle Scholar
10.Kumjian, A. and Pask, D., Higher rank graph C*-algebras, New York J. Math. 6 (2000), 120.Google Scholar
11.Kumjian, A., Pask, D. and Raeburn, I., Cuntz–Krieger algebras of directed graphs, Pacific J. Math. 184 (1998), 161174.Google Scholar
12.Kumjian, A., Pask, D., Raeburn, I. and Renault, J., Graphs, groupoids, and Cuntz–Krieger algebras, J. Funct. Anal. 144 (1997), 505541.Google Scholar
13.Lewin, P. and Sims, A., Aperiodicity and cofinality for finitely aligned higher-rank graphs, Math. Proc. Cambridge Philos. Soc. 149 (2010), 333350.Google Scholar
14.Raeburn, I., Graph algebras. CBMS Regional Conference Series in Mathematics, vol. 103. Published for the Conference Board of the Mathematical Sciences, Washington, DC. (American Mathematical Society, Providence, RI, 2005).CrossRefGoogle Scholar
15.Raeburn, I. and Sims, A., Product systems of graphs and the Toeplitz algebras of higher-rank graphs, J. Operator Theory 53 (2005), 399429.Google Scholar
16.Raeburn, I., Sims, A. and Yeend, T., The C*-algebras of finitely aligned higher-rank graphs, J. Funct. Anal. 213 (2004), 206240.Google Scholar
17.Robertson, D. I. and Sims, A., Simplicity of C*-algebras associated to higher-rank graphs, Bull. London Math. Soc. 39 (2007), 337344.Google Scholar
18.Sims, A., Relative Cuntz–Krieger algebras of finitely aligned higher-rank graphs, Indiana Univ. Math. J. 55 (2006), 849868.CrossRefGoogle Scholar
19.Sims, A. and Webster, S. B. G., A direct approach to co-universal algebras associated to directed graphs, Bull. Malays. Math. Sci. Soc. 33 (2) (2010), 211220.Google Scholar