Weyl-Heisenberg covariant quantization for the discrete torus
Abstract
Covariant integral quantization is implemented for systems whose phase space is Zd × Zd, i.e., for systems moving on the discrete periodic set Zd= \0,1,…c d-1 mod d\. The symmetry group of this phase space is the periodic discrete version of the Weyl-Heisenberg group, namely the central extension of the abelian group Zd × Zd. In this regard, the phase space is viewed as the left coset of the group with its center. The non-trivial unitary irreducible representation of this group, as acting on L2(ZN), is square integrable on the phase phase. We derive the corresponding covariant integral quantizations from (weight) functions on the phase space, and display their phase space portrait.
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