Related papers: Eigenstate capacity and Page curve in fermionic Gaussian states

Eigenstate capacity and Page curve in fermionic Gaussian states

URL: http://arxiv.org/abs/2109.00557v2
Date: Wed, 8 Dec 2021 11:53:06 GMT
Title: Eigenstate capacity and Page curve in fermionic Gaussian states
Authors: Budhaditya Bhattacharjee, Pratik Nandy, Tanay Pathak
Abstract summary: Capacity of entanglement (CoE) is an information-theoretic measure of entanglement, defined as the variance of modular Hamiltonian. We derive an exact expression for the average eigenstate CoE in fermionic Gaussian states as a finite series. We identify this as a distinguishing feature between integrable and quantum-chaotic systems.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: Capacity of entanglement (CoE), an information-theoretic measure of entanglement, defined as the variance of modular Hamiltonian, is known to capture the deviation from the maximal entanglement. We derive an exact expression for the average eigenstate CoE in fermionic Gaussian states as a finite series, valid for arbitrary bi-partition of the total system. Further, we consider the complex SYK$_2$ model in the thermodynamic limit and we obtain a closed-form expression of average CoE. In this limit, the variance of the average CoE becomes independent of the system size. Moreover, when the subsystem size is half of the total system, the leading volume-law coefficient approaches a value of $\pi^{2}/8 - 1$. We identify this as a distinguishing feature between integrable and quantum-chaotic systems. We confirm our analytical results by numerical computations.

Related papers

Gaussian Entanglement Measure: Applications to Multipartite Entanglement of Graph States and Bosonic Field Theory [50.24983453990065]
An entanglement measure based on the Fubini-Study metric has been recently introduced by Cocchiarella and co-workers. We present the Gaussian Entanglement Measure (GEM), a generalization of geometric entanglement measure for multimode Gaussian states. By providing a computable multipartite entanglement measure for systems with a large number of degrees of freedom, we show that our definition can be used to obtain insights into a free bosonic field theory.
arXiv Detail & Related papers (2024-01-31T15:50:50Z)
On optimization of coherent and incoherent controls for two-level quantum systems [77.34726150561087]
This article considers some control problems for closed and open two-level quantum systems. The closed system's dynamics is governed by the Schr"odinger equation with coherent control. The open system's dynamics is governed by the Gorini-Kossakowski-Sudarshan-Lindblad master equation.
arXiv Detail & Related papers (2022-05-05T09:08:03Z)
Eigenstate entanglement in integrable collective spin models [0.0]
The average entanglement entropy (EE) of the energy eigenstates in non-vanishing partitions has been recently proposed as a diagnostic of integrability in quantum many-body systems. We numerically demonstrate that the aforementioned average EE in the thermodynamic limit is universal for all parameter values of the LMG model.
arXiv Detail & Related papers (2021-08-22T23:00:04Z)
Entanglement Entropy of Non-Hermitian Free Fermions [59.54862183456067]
We study the entanglement properties of non-Hermitian free fermionic models with translation symmetry. Our results show that the entanglement entropy has a logarithmic correction to the area law in both one-dimensional and two-dimensional systems.
arXiv Detail & Related papers (2021-05-20T14:46:09Z)
Entanglement Measures in a Nonequilibrium Steady State: Exact Results in One Dimension [0.0]
Entanglement plays a prominent role in the study of condensed matter many-body systems. We show that the scaling of entanglement with the length of a subsystem is highly unusual, containing both a volume-law linear term and a logarithmic term.
arXiv Detail & Related papers (2021-05-03T10:35:09Z)
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)
Determination of the critical exponents in dissipative phase transitions: Coherent anomaly approach [51.819912248960804]
We propose a generalization of the coherent anomaly method to extract the critical exponents of a phase transition occurring in the steady-state of an open quantum many-body system.
arXiv Detail & Related papers (2021-03-12T13:16:18Z)
Entanglement distribution in the Quantum Symmetric Simple Exclusion Process [0.0]
We study the probability distribution of entanglement in the Quantum Symmetric Simple Exclusion Process. By means of a Coulomb gas approach from Random Matrix Theory, we compute analytically the large-deviation function of the entropy in the thermodynamic limit.
arXiv Detail & Related papers (2021-02-09T10:25:04Z)
Self-consistent microscopic derivation of Markovian master equations for open quadratic quantum systems [0.0]
We provide a rigorous construction of Markovian master equations for a wide class of quantum systems. We show that, for non-degenerate systems under a full secular approximation, the effective Lindblad operators are the normal modes of the system. We also address the particle and energy current flowing through the system in a minimal two-bath scheme and find that they hold the structure of Landauer's formula.
arXiv Detail & Related papers (2021-01-22T19:25:17Z)
Convergence of eigenstate expectation values with system size [2.741266294612776]
We study how fast the eigenstate expectation values of a local operator converge to a smooth function of energy density as the system size diverges. In translation-invariant quantum lattice systems in any spatial dimension, we prove that for all but a measure zero set of local operators, the deviations of finite-size eigenstate expectation values are lower bounded by $1/O(N)$.
arXiv Detail & Related papers (2020-09-10T19:00:34Z)
The role of boundary conditions in quantum computations of scattering observables [58.720142291102135]
Quantum computing may offer the opportunity to simulate strongly-interacting field theories, such as quantum chromodynamics, with physical time evolution. As with present-day calculations, quantum computation strategies still require the restriction to a finite system size. We quantify the volume effects for various $1+1$D Minkowski-signature quantities and show that these can be a significant source of systematic uncertainty.
arXiv Detail & Related papers (2020-07-01T17:43:11Z)

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