Fourier transform, Schr\"odinger representation, and Heisenberg modules

Abstract

We investigate and review how Fourier transform is involved in the analysis of a twisted group algebra L1(G, σ) for G=× and σ:G× G T 2- cocycle where is a locally compact abelian group and its Pontryagin dual. By weaving the Schr\"odinger representation and Fourier transform, we construct the dual equivalence bimodule of the Heisenberg bimodule generated by the dual Schr\"odinger representation and observe several relations between them including the application of noncommutative solitons.