Characterizing Kirkwood-Dirac nonclassicality and uncertainty diagram based on discrete Fourier transform

Abstract

In this paper, we investigate the Kirkwood-Dirac nonclassicality and uncertainty diagram based on discrete Fourier transform (DFT) in a d dimensional system. The uncertainty diagram of complete incompatibility bases A, B are characterized by De Bi\`evre [arXiv: 2207.07451]. We show that for the uncertainty diagram of the DFT matrix which is a transition matrix from basis A to basis B, there is no ``hole" in the region of the (n A, n B)-plane above and on the line n A+n B≥ d+1, whether the bases A, B are not complete incompatible bases or not. Then we present that the KD nonclassicality of a state based on the DFT matrix can be completely characterized by using the support uncertainty relation n A()n B()≥ d, where n A() and n B() count the number of nonvanishing coefficients in the basis A and B representations, respectively. That is, a state | is KD nonclassical if and only if n A()n B()> d, whenever d is prime or not. That gives a positive answer to the conjecture in [Phys. Rev. Lett. 127, 190404 (2021)].