Coherence number as a discrete quantum resource
Abstract
We introduce a new discrete coherence monotone named the \emph{coherence number}, which is a generalization of the coherence rank to mixed states. After defining the coherence number in a similar manner to the Schmidt number in entanglement theory, we present a necessary and sufficient condition of the coherence number for a coherent state to be converted to an entangled state of nonzero -concurrence (a member of the generalized concurrence family with ). It also turns out that the coherence number is a useful measure to understand the process of Grover search algorithm of items. We show that the coherence number remains and falls abruptly when the success probability of the searching process becomes maximal. This phenomenon motivates us to analyze the depletion pattern of (the last member of the generalized coherence concurrence, nonzero when the coherence number is ), which turns out to be an optimal resource for the process since it is completely consumed to finish the searching task.
Cite
@article{arxiv.1702.03219,
title = {Coherence number as a discrete quantum resource},
author = {Seungbeom Chin},
journal= {arXiv preprint arXiv:1702.03219},
year = {2017}
}
Comments
10 pages, Revtex 4.1; (v3) new analysis on the aspect of coherence number as a resource for the Grover algorithm, former title "Conversion of Coherence into Entanglement $ k $-concurrence" ; (v4) minor corrections and clarifications, 1 figure added