Fourier Invariant Partially Approximating Subalgebras of the Irrational Rotation C*-Algebra |
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| Authors: | Walters S. |
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| Affiliation: | Department of Mathematics and Computer Science, The University of Northern British Columbia Prince George, B.C. V2N 4Z9, Canada. E-mail: walters{at}hilbert.unbc.ca, walters{at}unbc.ca, http://hilbert.unbc.ca/walters |
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| Abstract: | For a dense G -set of parameters, the irrational rotation algebrais shown to contain infinitely many C*-subalgebras satisfyingthe following properties. Each subalgebra is isomorphic to adirect sum of two matrix algebras of the same (perfect square)dimension; the Fourier transform maps each summand onto theother; the corresponding unit projection is approximately central;the compressions of the canonical generators of the irrationalrotation algebra are approximately contained in the subalgebra.2000 Mathematics Subject Classification 46L80, 46L40, 46L35. |
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| Keywords: | C*-algebras irrational rotation algebras automorphisms inductive limits K-groups AF-algebras theta functions |
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