Quantum Mechanics on a Torus
Abstract
We present here a canonical description for quantizing classical maps on a torus. We prove theorems analagous to classical theorems on mixing and ergodicity in terms of a quantum Koopman space L2 (A,τ) obtained as the completion of the algebra of observables A in the norm induced by the following inner product (A,B) =τ(AB) , where τ is a linear functional on the algebra analogous to the classical ``integral over phase space.'' We also derive explicit formulas connecting this formulation to the θ -torus decomposition of Bargmann space introduced in ref. citeKLMR.
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