On discrete Wigner transforms

Abstract

In this work, we derive a discrete analog of the Wigner transform over the space (Cp) N for any prime p and any positive integer N. We show that the Wigner transform over this space can be constructed as the inverse Fourier transform of the standard Pauli matrices for p=2 or more generally of the Heisenberg-Weyl group elements for p > 2. We connect our work to a previous construction by Wootters of a discrete Wigner transform by showing that for all p, Wootters' construction corresponds to taking the inverse symplectic Fourier transform instead of the inverse Fourier transform. Finally, we discuss some implications of these results for the numerical simulation of many-body quantum spin systems.