Noncommutative torus mathematics , and more specifically in the theory of C*-algebras, the noncommutative toriA θ , also known as irrational rotation algebrasirrational values of θ, form a family of noncommutative C*-algebras which generalize the algebra of continuous functions on the 2-torus . Many topological and geometric properties of the classical 2-torus have algebraic analogues for the noncommutative tori, and as such they are fundamental examples of a noncommutative space in the sense of Alain Connes .Definition For any real number θ , the noncommutative torus A θ B , the algebra of bounded linear operators of square-integrable functions on the unit circle S 1 of C , generated by the unitary elements U and V , where U =zf and V =f . A quick calculation shows that VU = e −2πi θ UV .Alternative characterizations Universal property: A θ U and V satisfying the relation VU = e2πi θ UV . This definition extends to the case when θ is rational. In particular when θ = 0, A θ continuous functions on the 2-torus by the Gelfand transform . Irrational rotation algebra:infinite cyclic group Z act on the circle S 1 by the rotation action by angle 2iθ . This induces an action of Z by automorphisms on the algebra of continuous functions C . The resulting C*-crossed product C ⋊ Z is isomorphic to A θ Z and the identity function on the circle z : S 1 → C . Twisted group algebra: The function σ : Z 2 × Z 2 → C ; σ, ) = e 2πinpθ is a group 2-cocycle on Z 2 , and the corresponding twisted group algebra C* is isomorphic to A θ Properties Every irrational rotation algebra A θ Every irrational rotation algebra has a unique tracial state . The irrational rotation algebras are nuclear .Classification and K-theory A θ Z 2 in both even dimension and odd dimension, and so does not distinguish the irrational rotation algebras. But as an ordered group , K 0 ≃ Z + θ Z. Therefore, two noncommutative tori A θ A η if and only if either θ + η or θ − η is an integer.A θ A η strongly Morita equivalent if and only if θ and η are in the same orbit of the action of SL on R by fractional linear transformations . In particular, the noncommutative tori with θ rational are Morita equivalent to the classical torus. On the other hand , the noncommutative tori with θ irrational are simple C*-algebras.
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