The Heisenberg-Weyl-parity group its coherent states and a unified Wigner-Weyl function

Abstract

The Heisenberg-Weyl group HW(d) related to a d-dimensional Hilbert space H(d), is enlarged into the Heisenberg-Weyl-parity group HWP(d) that incorporates parity transformations. It consists of 2d3 elements, of which d3 elements belong to the HW(d) subgroup, and extra d3 elements which are related through a Fourier transform with the former ones. It is shown that HWP(d) is a generalised version of the dihedral group. The properties of operators that combine displacements and parity, are discussed. HWP(d) is shown to be a solvable group, and commutators of its elements perform displacement and parity transformations of quantum states, along loops in the discrete phase space.2d2 coherent states related to the HWP(d) group are introduced, which consist of d2 coherent states related to the HW(d) subgroup, and extra d2 coherent states which are related through a Fourier transform with the former ones. In noisy cases, expansion of an arbitrary state in terms of the 2d2 coherent states with Bargmann coefficients, is advantageous in comparison to expansion in terms of the d2 coherent states related to HW(d). One of the consequences of the HWP(d) group, is a natural unification of the Wigner and Weyl functions. The properties of the unified Wigner-Weyl function are discussed.