Tutorial on Rational Rotation C*--Algebras

Abstract

The rotation algebra Aθ is the universal C*--algebra generated by unitary operators U, V satisfying the commutation relation UV = ω V U where ω= e2π i θ. They are rational if θ = p/q with 1 ≤ p ≤ q-1, othewise irrational. Operators in these algebras relate to the quantum Hall effect boca,rammal,simon, kicked quantum systems lawton1, wang, and the spectacular solution of the Ten Martini problem avila. Brabanter brabanter and Yin yin classified rational rotation C*--algebras up to *-isomorphism. Stacey stacey constructed their automorphism groups. They used methods known to experts: cocycles, crossed products, Dixmier-Douady classes, ergodic actions, K--theory, and Morita equivalence. This expository paper defines Ap/q as a C*--algebra generated by two operators on a Hilbert space and uses linear algebra, Fourier series and the Gelfand-Naimark-Segal construction gelfand to prove its universality. It then represents it as the algebra of sections of a matrix algebra bundle over a torus to compute its isomorphism class. The remarks section relates these concepts to general operator algebra theory. We write for mathematicians who are not C*--algebra experts.