Related papers: A Universal Quantum Certainty Relation for Arbitrary Number of Observables

A Universal Quantum Certainty Relation for Arbitrary Number of Observables

URL: http://arxiv.org/abs/2308.05690v1
Date: Thu, 10 Aug 2023 16:44:10 GMT
Title: A Universal Quantum Certainty Relation for Arbitrary Number of Observables
Authors: Ao-Xiang Liu, Ma-Cheng Yang and Cong-Feng Qiao
Abstract summary: We derive by lattice theory a universal quantum certainty relation for arbitrary $M$ observables in $N$-dimensional system. We find that one cannot prepare a quantum state with PDVs of incompatible observables spreading out arbitrarily.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: We derive by lattice theory a universal quantum certainty relation for arbitrary $M$ observables in $N$-dimensional system, which provides a state-independent maximum lower bound on the direct-sum of the probability distribution vectors (PDVs) in terms of majorization relation. While the utmost lower bound coincides with $(1/N,...,1/N)$ for any two orthogonal bases, the majorization certainty relation for $M\geqslant3$ is shown to be nontrivial. The universal majorization bounds for three mutually complementary observables and a more general set of observables in dimension-2 are achieved. It is found that one cannot prepare a quantum state with PDVs of incompatible observables spreading out arbitrarily. Moreover, we obtain a complementary relation for the quantum coherence as well, which characterizes a trade-off relation of quantum coherence with different bases.

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