Related papers: Continuous majorization in quantum phase space with Wigner negativity

Continuous majorization in quantum phase space with Wigner negativity

URL: http://arxiv.org/abs/2412.19698v1
Date: Fri, 27 Dec 2024 15:51:15 GMT
Title: Continuous majorization in quantum phase space with Wigner negativity
Authors: Jan de Boer, Giuseppe Di Giulio, Esko Keski-Vakkuri, Erik Tonni,
Abstract summary: We develop the theory of continuous majorization in the general $N$-mode case. We prove a conjecture made by Van Herstraeten, Jabbour and Cerf for the convex hull of $N$-mode Gaussian states.
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Abstract: Different variants of partial orders among quantum states arise naturally in the context of various quantum resources. For example, in discrete variable quantum computation, stabilizer operations naturally produce an order between input and output states; in technical terms this order is vector majorization of discrete Wigner functions in discrete phase space. The order results in inequalities for magic monotones. In the continuous variable case, a natural counterpart would be continuous majorization of Wigner functions in quantum phase space. Indeed, this concept was recently proposed and explored (mostly restricting to the single-mode case) in Van Herstraeten, Jabbour, Cerf, Quantum 7, 1021 (2023). In this work, we develop the theory of continuous majorization in the general $N$-mode case. In particular, we propose extensions to include states with finite Wigner negativity. Among our results, we prove a conjecture made by Van Herstraeten, Jabbour and Cerf for the convex hull of $N$-mode Gaussian states, and a phase space counterpart of Uhlmann's theorem of majorization.

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