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Main Authors: Hovhannisyan, Karen V., Simon, Rick P. A., Anders, Janet
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2412.19801
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author Hovhannisyan, Karen V.
Simon, Rick P. A.
Anders, Janet
author_facet Hovhannisyan, Karen V.
Simon, Rick P. A.
Anders, Janet
contents Ergotropy -- the maximal amount of unitarily extractable work -- measures the ``charge level'' of quantum batteries. We prove that in large many-body batteries ergotropy exhibits a concentration of measure phenomenon. Namely, the ergotropy of such systems is almost constant for almost all states sampled from the Hilbert--Schmidt measure. We establish this by first proving that ergotropy, as a function of the state, is Lipschitz-continuous with respect to the Bures distance, and then applying Levy's measure concentration lemma. In parallel, we showcase the analogous properties of von Neumann entropy, compiling and adapting known results about its continuity and concentration properties. Furthermore, we consider the situation with the least amount of prior information about the state. This corresponds to the quantum version of the Jeffreys prior distribution -- the Bures measure. In this case, there exist no analytical bounds guaranteeing exponential concentration of measure. Nonetheless, we provide numerical evidence that ergotropy, as well as von Neumann entropy, concentrate also in this case.
format Preprint
id arxiv_https___arxiv_org_abs_2412_19801
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Concentration of ergotropy in many-body systems
Hovhannisyan, Karen V.
Simon, Rick P. A.
Anders, Janet
Quantum Physics
Statistical Mechanics
Ergotropy -- the maximal amount of unitarily extractable work -- measures the ``charge level'' of quantum batteries. We prove that in large many-body batteries ergotropy exhibits a concentration of measure phenomenon. Namely, the ergotropy of such systems is almost constant for almost all states sampled from the Hilbert--Schmidt measure. We establish this by first proving that ergotropy, as a function of the state, is Lipschitz-continuous with respect to the Bures distance, and then applying Levy's measure concentration lemma. In parallel, we showcase the analogous properties of von Neumann entropy, compiling and adapting known results about its continuity and concentration properties. Furthermore, we consider the situation with the least amount of prior information about the state. This corresponds to the quantum version of the Jeffreys prior distribution -- the Bures measure. In this case, there exist no analytical bounds guaranteeing exponential concentration of measure. Nonetheless, we provide numerical evidence that ergotropy, as well as von Neumann entropy, concentrate also in this case.
title Concentration of ergotropy in many-body systems
topic Quantum Physics
Statistical Mechanics
url https://arxiv.org/abs/2412.19801