Related papers: Extensive R\'enyi entropies in matrix product states

Extensive R\'enyi entropies in matrix product states

URL: http://arxiv.org/abs/2008.11764v2
Date: Fri, 28 Aug 2020 08:51:05 GMT
Title: Extensive R\'enyi entropies in matrix product states
Authors: Alberto Rolandi, Henrik Wilming
Abstract summary: We prove that all R'enyi entanglement entropies of spin-chains described by generic (gapped) are extensive for disconnected sub-systems. For unital quantum channels this yields a very simple lower bound on the distribution of singular values and the expansion coefficient in terms of the Kraus-rank.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: We prove that all R\'enyi entanglement entropies of spin-chains described by generic (gapped), translational invariant matrix product states (MPS) are extensive for disconnected sub-systems: All R\'enyi entanglement entropy densities of the sub-system consisting of every k-th spin are non-zero in the thermodynamic limit if and only if the state does not converge to a product state in the thermodynamic limit. Furthermore, we provide explicit lower bounds to the entanglement entropy in terms of the expansion coefficient of the transfer operator of the MPS and spectral properties of its fixed point in canonical form. As side-result we obtain a lower bound for the expansion coefficient and singular value distribution of a primitve quantum channel in terms of its Kraus-rank and entropic properties of its fixed-point. For unital quantum channels this yields a very simple lower bound on the distribution of singular values and the expansion coefficient in terms of the Kraus-rank. Physically, our results are motivated by questions about equilibration in many-body localized systems, which we review.

Related papers

Continuity of entropies via integral representations [16.044444452278064]
We show that Frenkel's integral representation of the quantum relative entropy provides a natural framework to derive continuity bounds for quantum information measures. We obtain a number of results: (1) a tight continuity relation for the conditional entropy in the case where the two states have equal marginals on the conditioning system, resolving a conjecture by Wilde in this special case; (2) a stronger version of the Fannes-Audenaert inequality on quantum entropy; and (3) better estimates on the quantum capacity of approximately degradable channels.
arXiv Detail & Related papers (2024-08-27T17:44:52Z)
Universality of critical dynamics with finite entanglement [68.8204255655161]
We study how low-energy dynamics of quantum systems near criticality are modified by finite entanglement. Our result establishes the precise role played by entanglement in time-dependent critical phenomena.
arXiv Detail & Related papers (2023-01-23T19:23:54Z)
Asymptotic Equipartition Theorems in von Neumann algebras [24.1712628013996]
We show that the smooth max entropy of i.i.d. states on a von Neumann algebra has an rate given by the quantum relative entropy. Our AEP not only applies to states, but also to quantum channels with appropriate restrictions.
arXiv Detail & Related papers (2022-12-30T13:42:35Z)
Deviation from maximal entanglement for mid-spectrum eigenstates of local Hamiltonians [6.907555940790131]
In a spin chain governed by a local Hamiltonian, we consider a microcanonical ensemble in the middle of the energy spectrum and a contiguous subsystem whose length is a constant fraction of the system size. We prove that if the bandwidth of the ensemble is greater than a certain constant, then the average entanglement entropy of eigenstates in the ensemble deviates from the maximum entropy by at least a positive constant.
arXiv Detail & Related papers (2022-02-02T18:05:50Z)
R\'enyi entropies and negative central charges in non-Hermitian quantum systems [0.0]
We propose a natural extension of entanglement and R'enyi entropies to non-Hermitian quantum systems. We demonstrate the proposed entanglement quantities which are referred to as generic entanglement and R'enyi entropies.
arXiv Detail & Related papers (2021-07-27T18:00:01Z)
Exact thermal properties of free-fermionic spin chains [68.8204255655161]
We focus on spin chain models that admit a description in terms of free fermions. Errors stemming from the ubiquitous approximation are identified in the neighborhood of the critical point at low temperatures.
arXiv Detail & Related papers (2021-03-30T13:15:44Z)
Catalytic Transformations of Pure Entangled States [62.997667081978825]
Entanglement entropy is the von Neumann entropy of quantum entanglement of pure states. The relation between entanglement entropy and entanglement distillation has been known only for the setting, and the meaning of entanglement entropy in the single-copy regime has so far remained open. Our results imply that entanglement entropy quantifies the amount of entanglement available in a bipartite pure state to be used for quantum information processing, giving results an operational meaning also in entangled single-copy setup.
arXiv Detail & Related papers (2021-02-22T16:05:01Z)
Complete entropic inequalities for quantum Markov chains [17.21921346541951]
We prove that every GNS-symmetric quantum Markov semigroup on a finite dimensional algebra satisfies a modified log-Sobolev inequality. We also establish the first general approximateization property of relative entropy.
arXiv Detail & Related papers (2021-02-08T11:47:37Z)
Additivity violation of quantum channels via strong convergence to semi-circular and circular elements [1.9336815376402714]
We prove the additivity violation via Haagerup inequality for a new class of random quantum channels constructed by rectifying the above completely positive maps based on strong convergence.
arXiv Detail & Related papers (2021-01-02T11:17:55Z)
Quantum correlation entropy [0.0]
We study quantum coarse-grained entropy and demonstrate that the gap in entropy between local and global coarse-grainings is a natural generalization of entanglement entropy to mixed states and multipartite systems. This "quantum correlation entropy" $Srm QC$ is additive over independent systems, measures total nonclassical correlations, and reduces to the entanglement entropy for bipartite pure states.
arXiv Detail & Related papers (2020-05-11T20:13:43Z)

This list is automatically generated from the titles and abstracts of the papers in this site.