Realization of a simple higher-dimensional noncommutative torus as a transformation group C*-algebra

doi:10.1112/blms/bdn001

Bulletin of the London Mathematical Society Advance Access published online on March 20, 2008
Bulletin of the London Mathematical Society, doi:10.1112/blms/bdn001

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Realization of a simple higher-dimensional noncommutative torus as a transformation group C*-algebra

Benjamín A. Itzá-Ortiz

Centro de Investigación en Matemáticas
Universidad Autónoma del Estado de Hidalgo
Pachuca de Soto Hidalgo 42184
México

N. Christopher Phillips

Department of Mathematics
University of Oregon
Eugene, OR 97403-1222
USA
ncp@darkwing.uoregon.edu

Received 15 May 2007.

Let ${theta}$ be a nondegenerate skew symmetric real dxd matrix, andlet A be the corresponding simple higher-dimensional noncommutativetorus. Suppose that d is odd, or that d $≥$ 4 and the entries of ${theta}$ are not contained in a quadratic extension of $Q$ . Then A is isomorphicto the transformation group C*-algebra obtained from a minimalhomeomorphism of a compact connected one-dimensional space locallyhomeomorphic to the product of the interval and the Cantor set.The proof uses classification theory of C*-algebras.

Reasearch of the first author is partially supported by CONACYTgrant 050233. Research of the second author is partially supportedby NSF grant DMS 0302401.

2000 Mathematics Subject Classification 46L55 (primary), 46L35,54H20 (secondary).

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