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Main Authors: Arias, Raúl, de Boer, Jan, Di Giulio, Giuseppe, Keski-Vakkuri, Esko, Tonni, Erik
Format: Preprint
Published: 2023
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Online Access:https://arxiv.org/abs/2301.01053
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author Arias, Raúl
de Boer, Jan
Di Giulio, Giuseppe
Keski-Vakkuri, Esko
Tonni, Erik
author_facet Arias, Raúl
de Boer, Jan
Di Giulio, Giuseppe
Keski-Vakkuri, Esko
Tonni, Erik
contents We introduce two infinite sequences of entanglement monotones, which are constructed from expectation values of polynomials in the modular Hamiltonian. These monotones yield infinite sequences of inequalities that must be satisfied in majorizing state transitions. We demonstrate this for information erasure, deriving an infinite sequence of "Landauer inequalities" for the work cost, bounded by linear combinations of expectation values of powers of the modular Hamiltonian. These inequalities give improved lower bounds for the work cost in finite dimensional systems, and depend on more details of the erased state than just on its entropy and variance of modular Hamiltonian. Similarly one can derive lower bounds for marginal entropy production for a system coupled to an environment. These infinite sequences of entanglement monotones also give rise to relative quantifiers that are monotonic in more general processes, namely those involving so-called $σ$-majorization with respect to a fixed point full rank state $σ$; such quantifiers are called resource monotones. As an application to thermodynamics, one can use them to derive finite-dimension corrections to the Clausius inequality. Finally, in order to gain some intuition for what (if anything) plays the role of majorization in field theory, we compare pairs of states in discretized theories at criticality and study how majorization depends on the size of the bipartition with respect to the size of the entire chain.
format Preprint
id arxiv_https___arxiv_org_abs_2301_01053
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle Sequences of resource monotones from modular Hamiltonian polynomials
Arias, Raúl
de Boer, Jan
Di Giulio, Giuseppe
Keski-Vakkuri, Esko
Tonni, Erik
Quantum Physics
Statistical Mechanics
High Energy Physics - Theory
We introduce two infinite sequences of entanglement monotones, which are constructed from expectation values of polynomials in the modular Hamiltonian. These monotones yield infinite sequences of inequalities that must be satisfied in majorizing state transitions. We demonstrate this for information erasure, deriving an infinite sequence of "Landauer inequalities" for the work cost, bounded by linear combinations of expectation values of powers of the modular Hamiltonian. These inequalities give improved lower bounds for the work cost in finite dimensional systems, and depend on more details of the erased state than just on its entropy and variance of modular Hamiltonian. Similarly one can derive lower bounds for marginal entropy production for a system coupled to an environment. These infinite sequences of entanglement monotones also give rise to relative quantifiers that are monotonic in more general processes, namely those involving so-called $σ$-majorization with respect to a fixed point full rank state $σ$; such quantifiers are called resource monotones. As an application to thermodynamics, one can use them to derive finite-dimension corrections to the Clausius inequality. Finally, in order to gain some intuition for what (if anything) plays the role of majorization in field theory, we compare pairs of states in discretized theories at criticality and study how majorization depends on the size of the bipartition with respect to the size of the entire chain.
title Sequences of resource monotones from modular Hamiltonian polynomials
topic Quantum Physics
Statistical Mechanics
High Energy Physics - Theory
url https://arxiv.org/abs/2301.01053