Classification of incompatibility for two orthonormal bases
Abstract
For two orthonormal bases of a d-dimensional complex Hilbert space, the notion of complete incompatibility was introduced recently by De Bi\`evre [Phys. Rev. Lett. 127, 190404 (2021)]. In this work, we introduce the notion of s-order incompatibility with positive integer s satisfying 2≤ s≤ d+1. In particular, (d+1)-order incompatibility just coincides with the complete incompatibility. We establish some relations between s-order incompatibility, minimal support uncertainty and rank deficiency of the transition matrix. As an example, we determine the incompatibility order of the discrete Fourier transform with any finite dimension.
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