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On discrete Wigner transforms

Publication ,  Journal Article
Cai, Z; Lu, J; Stubbs, K
February 15, 2018

In this work, we derive a discrete analog of the Wigner transform over the space $(\mathbb{C}^p)^{\otimes N}$ 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.

Duke Scholars

Publication Date

February 15, 2018
 

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Cai, Z., Lu, J., & Stubbs, K. (2018). On discrete Wigner transforms.
Cai, Zhenning, Jianfeng Lu, and Kevin Stubbs. “On discrete Wigner transforms,” February 15, 2018.
Cai Z, Lu J, Stubbs K. On discrete Wigner transforms. 2018 Feb 15;
Cai, Zhenning, et al. On discrete Wigner transforms. Feb. 2018.
Cai Z, Lu J, Stubbs K. On discrete Wigner transforms. 2018 Feb 15;

Publication Date

February 15, 2018