Related papers: Trade-off relations of geometric coherence

Trade-off relations of geometric coherence

URL: http://arxiv.org/abs/2310.15476v1
Date: Tue, 24 Oct 2023 03:04:59 GMT
Title: Trade-off relations of geometric coherence
Authors: Bingyu Hu and Ming-Jing Zhao
Abstract summary: We study the trade-off relation of geometric coherence in qubit systems. We derive the quantum uncertainty relations of the geometric coherence on two and three general measurement bases.
Score: 0.43512163406552007
License: http://creativecommons.org/licenses/by/4.0/
Abstract: Quantum coherence is an important quantum resource and it is intimately related to various research fields. The geometric coherence is a coherence measure both operationally and geometrically. We study the trade-off relation of geometric coherence in qubit systems. We first derive an upper bound for the geometric coherence by the purity of quantum states. Based on this, a complementarity relation between the quantum coherence and the mixedness is established. We then derive the quantum uncertainty relations of the geometric coherence on two and three general measurement bases in terms of the incompatibility respectively, which turn out to be state-independent for pure states. These trade-off relations provide the limit to the amount of quantum coherence. As a byproduct,the complementarity relation between the minimum error probability for discriminating a pure-states ensemble and the mixedness of quantum states is established.

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