Your search keyword '"Eigenstate thermalization hypothesis"' showing total 332 results

1. Time Evolution of Typical Pure States from a Macroscopic Hilbert Subspace.

Author

Teufel, Stefan, Tumulka, Roderich, and Vogel, Cornelia

Abstract

We consider a macroscopic quantum system with unitarily evolving pure state ψ t ∈ H and take it for granted that different macro states correspond to mutually orthogonal, high-dimensional subspaces H ν (macro spaces) of H . Let P ν denote the projection to H ν . We prove two facts about the evolution of the superposition weights ‖ P ν ψ t ‖ 2 : First, given any T > 0 , for most initial states ψ 0 from any particular macro space H μ (possibly far from thermal equilibrium), the curve t ↦ ‖ P ν ψ t ‖ 2 is approximately the same (i.e., nearly independent of ψ 0 ) on the time interval [0, T]. And second, for most ψ 0 from H μ and most t ∈ [ 0 , ∞) , ‖ P ν ψ t ‖ 2 is close to a value M μ ν that is independent of both t and ψ 0 . The first is an instance of the phenomenon of dynamical typicality observed by Bartsch, Gemmer, and Reimann, and the second modifies, extends, and in a way simplifies the concept, introduced by von Neumann, now known as normal typicality. [ABSTRACT FROM AUTHOR]

Published

2023

2. Quantization of Integrable and Chaotic Three-Particle Fermi–Pasta–Ulam–Tsingou Models.

Author

Arzika, Alio Issoufou, Solfanelli, Andrea, Schmid, Harald, and Ruffo, Stefano

Subjects

*GEOMETRIC quantization, *PHASE space, *QUANTUM chaos, *HAMILTONIAN systems

Abstract

We study the transition from integrability to chaos for the three-particle Fermi–Pasta–Ulam–Tsingou (FPUT) model. We can show that both the quartic β -FPUT model ( α = 0 ) and the cubic one ( β = 0 ) are integrable by introducing an appropriate Fourier representation to express the nonlinear terms of the Hamiltonian. For generic values of α and β , the model is non-integrable and displays a mixed phase space with both chaotic and regular trajectories. In the classical case, chaos is diagnosed by the investigation of Poincaré sections. In the quantum case, the level spacing statistics in the energy basis belongs to the Gaussian orthogonal ensemble in the chaotic regime, and crosses over to Poissonian behavior in the quasi-integrable low-energy limit. In the chaotic part of the spectrum, two generic observables obey the eigenstate thermalization hypothesis. [ABSTRACT FROM AUTHOR]

Published

2023

3. Chaos and Thermalization in the Spin-Boson Dicke Model.

Author

Villaseñor, David, Pilatowsky-Cameo, Saúl, Bastarrachea-Magnani, Miguel A., Lerma-Hernández, Sergio, Santos, Lea F., and Hirsch, Jorge G.

Subjects

*UNCERTAINTY (Information theory), *QUANTUM entropy, *THERMAL neutrons, *PHOTON counting, *DEGREES of freedom, *QUANTUM chaos

Abstract

We present a detailed analysis of the connection between chaos and the onset of thermalization in the spin-boson Dicke model. This system has a well-defined classical limit with two degrees of freedom, and it presents both regular and chaotic regions. Our studies of the eigenstate expectation values and the distributions of the off-diagonal elements of the number of photons and the number of excited atoms validate the diagonal and off-diagonal eigenstate thermalization hypothesis (ETH) in the chaotic region, thus ensuring thermalization. The validity of the ETH reflects the chaotic structure of the eigenstates, which we corroborate using the von Neumann entanglement entropy and the Shannon entropy. Our results for the Shannon entropy also make evident the advantages of the so-called "efficient basis" over the widespread employed Fock basis when investigating the unbounded spectrum of the Dicke model. The efficient basis gives us access to a larger number of converged states than what can be reached with the Fock basis. [ABSTRACT FROM AUTHOR]

Published

2023

4. Higher-Form Symmetry and Eigenstate Thermalization Hypothesis

Author

Fukushima, Osamu and Fukushima, Osamu

Published

2024

5. Thermalization in Open Quantum Wires via the Information Lattice

Author

Bilinskaya, Yuliya and Bilinskaya, Yuliya

Abstract

The Eigenstate Thermalization Hypothesis attempts to explain the process of thermaliza- tion in closed quantum systems, which is characterized by correlations over long distances. There are however quantum systems which evade thermalization. Understanding which are those systems and what happens once they interact with an environment, i.e., become open, is not straightforward. To shine more light on thermalization of a given system one can employ the information lattice approach, which calculates the correlations and visualizes exactly where the quantum information is stored in the system. One model of interest is the one-dimensional Kitaev chain, which is studied in this thesis in the closed and open regimes with the information lattice. This model presents the existence of the Majorana edge modes, which is an important concept for areas such as topological quantum computing. This thesis demonstrates in a novel way how an interacting closed Kitaev chain thermalizes locally. Further, in the open out-of- equilibrium regime the same thermalization dynamics are observed. The difference however is that over time all subsystems of the open Kitaev chain eventually develop maximum correla- tions with the bath. Additionally, different types of baths are used to verify the presence of Majorana edge modes in the steady state. Even though analysis of the specially engineered bath shows preservation of some local information, the edge Majorana modes are not preserved. The analysis is also extended onto the open Kitaev chain in the many-body localized phase, where the bath produces a different steady state as opposed to the non-disordered, non-interacting Kitaev chain.

Published

2024

6. Quantization of Integrable and Chaotic Three-Particle Fermi–Pasta–Ulam–Tsingou Models

Author

Alio Issoufou Arzika, Andrea Solfanelli, Harald Schmid, and Stefano Ruffo

Subjects

integrable systems, chaotic Hamiltonian systems, quantum chaos, eigenstate thermalization hypothesis, Science, Astrophysics, QB460-466, Physics, QC1-999

Abstract

We study the transition from integrability to chaos for the three-particle Fermi–Pasta–Ulam–Tsingou (FPUT) model. We can show that both the quartic β-FPUT model (α=0) and the cubic one (β=0) are integrable by introducing an appropriate Fourier representation to express the nonlinear terms of the Hamiltonian. For generic values of α and β, the model is non-integrable and displays a mixed phase space with both chaotic and regular trajectories. In the classical case, chaos is diagnosed by the investigation of Poincaré sections. In the quantum case, the level spacing statistics in the energy basis belongs to the Gaussian orthogonal ensemble in the chaotic regime, and crosses over to Poissonian behavior in the quasi-integrable low-energy limit. In the chaotic part of the spectrum, two generic observables obey the eigenstate thermalization hypothesis.

Published

2023

7. Chaos and Thermalization in the Spin-Boson Dicke Model

Author

David Villaseñor, Saúl Pilatowsky-Cameo, Miguel A. Bastarrachea-Magnani, Sergio Lerma-Hernández, Lea F. Santos, and Jorge G. Hirsch

Subjects

quantum chaos, eigenstate thermalization hypothesis, quantum entanglement, Science, Astrophysics, QB460-466, Physics, QC1-999

Abstract

We present a detailed analysis of the connection between chaos and the onset of thermalization in the spin-boson Dicke model. This system has a well-defined classical limit with two degrees of freedom, and it presents both regular and chaotic regions. Our studies of the eigenstate expectation values and the distributions of the off-diagonal elements of the number of photons and the number of excited atoms validate the diagonal and off-diagonal eigenstate thermalization hypothesis (ETH) in the chaotic region, thus ensuring thermalization. The validity of the ETH reflects the chaotic structure of the eigenstates, which we corroborate using the von Neumann entanglement entropy and the Shannon entropy. Our results for the Shannon entropy also make evident the advantages of the so-called “efficient basis” over the widespread employed Fock basis when investigating the unbounded spectrum of the Dicke model. The efficient basis gives us access to a larger number of converged states than what can be reached with the Fock basis.

Published

2022

8. On the Thermalization Hypothesis of Quantum States.

Author

Volovich, I. V. and Inozemcev, O. V.

Abstract

The eigenstate thermalization hypothesis (ETH) is discussed. We note that one common formulation of the ETH does not necessarily imply thermalization of an observable of an isolated many-body quantum system. We show that to get thermalization, one has to postulate the canonical or microcanonical distribution in the ETH ansatz. More generally, any other average can be postulated in the generalized ETH ansatz, which leads to a corresponding equilibration condition. [ABSTRACT FROM AUTHOR]

Published

2021

9. Variational Quantum Simulations of quantum many-body systems

Author

Universitat Politècnica de Catalunya. Institut de Ciències Fotòniques, Karlsruher Institut für Technologie, Lewenstein, Maciej, Liu, Yingjian, Universitat Politècnica de Catalunya. Institut de Ciències Fotòniques, Karlsruher Institut für Technologie, Lewenstein, Maciej, and Liu, Yingjian

Abstract

Eigenstate thermalization hypothesis (ETH) suggests that any initial state defined in some small subset of the total Hilbert space will eventually spread to the whole Hilbert space under unitary time evolution. However, there is a class of quantum states violating the hypothesis - so-called quantum many-body scars (QMBS). In this thesis, we focus on two problems related to QMBS. The first problem refers to the probing of ETH violation via the Inverse Participation Ratio (IPR) - a measure characterizing the fraction of the total Hilbert space occupied by the given quantum state. We propose two quantum algorithms implemented on quantum circuits to probe the IPR of quantum systems without a need for full diagonalization of the system Hamiltonian. We use the proposed algorithms to study the time evolution of IPR during spin squeezing protocol, to characterize the QMBS state in the extended PXP model, and to indicate the critical transition. The second task in this thesis belongs to the Hamiltonian Learning problems i.e. finding the Hamiltonian of the many-body quantum system having access only to a set of time-evolved states. In particular, we consider access to time-evolved states under the Hamiltonian supporting the existence of QMBS states. With the help of Quantum Graph Recurrent Neural Networks (QGRNN) and the hybrid quantum-classical variational algorithm technique, we extract the matrix representation of the Hamiltonian from scarred states.

Published

2023

10. Thermal inclusions: how one spin can destroy a many-body localized phase.

Author

Ponte, Pedro, Laumann, C. R., Huse, David A., and Chandran, A.

Subjects

*QUANTUM theory, *THERMAL analysis, *LOGARITHMS

Abstract

Many-body localized (MBL) systems lie outside the framework of statistical mechanics, as they fail to equilibrate under their own quantum dynamics. Even basic features of MBL systems, such as their stability to thermal inclusions and the nature of the dynamical transition to thermalizing behaviour, remain poorly understood. We study a simple central spin model to address these questions: a twolevel system interacting with strength J with N>>1 localized bits subject to random fields. On increasing J, the system transitions from an MBL to a delocalized phase on the vanishing scale Jc(N)~1/N, up to logarithmic corrections. In the transition region, the single-site eigenstate entanglement entropies exhibit bimodal distributions, so that localized bits are either 'on' (strongly entangled) or 'off' (weakly entangled) in eigenstates. The clusters of 'on' bits vary significantly between eigenstates of the same sample, which provides evidence for a heterogeneous discontinuous transition out of the localized phase in single-site observables. We obtain these results by perturbative mapping to bond percolation on the hypercube at small J and by numerical exact diagonalization of the full many-body system. Our results support the arguments that the MBL phase is unstable in systems with short-range interactions and quenched randomness in dimensions d that are high but finite. [ABSTRACT FROM AUTHOR]

Published

2017

11. On the Thermalization Hypothesis of Quantum States

Author

O. V. Inozemcev and I. V. Volovich

Subjects

Physics, Distribution (number theory), Mathematics::History and Overview, Observable, Computer Science::Computational Complexity, Physics::Geophysics, Mathematics (miscellaneous), Thermalisation, Quantum state, Quantum mechanics, Quantum system, Computer Science::Data Structures and Algorithms, Eigenstate thermalization hypothesis, Ansatz

Abstract

The eigenstate thermalization hypothesis (ETH) is discussed. We note that one common formulation of the ETH does not necessarily imply thermalization of an observable of an isolated many-body quantum system. We show that to get thermalization, one has to postulate the canonical or microcanonical distribution in the ETH ansatz. More generally, any other average can be postulated in the generalized ETH ansatz, which leads to a corresponding equilibration condition.

Published

2021

12. Generalized Gibbs Ensemble of 2D CFTs with U(1) charge from the AGT correspondence

Author

Fábio Novaes

Subjects

High Energy Physics - Theory, Canonical ensemble, Physics, Nuclear and High Energy Physics, Partition function (statistical mechanics), Conformal Field Theory, Integrable Hierarchies, Semiclassical physics, Theta function, Charge (physics), QC770-798, Conformal and W Symmetry, Condensed Matter - Strongly Correlated Electrons, Nuclear and particle physics. Atomic energy. Radioactivity, AGT correspondence, Effective field theory, Eigenstate thermalization hypothesis, Condensed Matter - Statistical Mechanics, Mathematical physics

Abstract

The Generalized Gibbs Ensemble (GGE) is relevant to understand the thermalization of quantum systems with an infinite set of conserved charges. In this work, we analyze the GGE partition function of 2D Conformal Field Theories (CFTs) with a U(1) charge and quantum Benjamin-Ono$_{2}$ (qBO$_{2}$) hierarchy charges. We use the Alday-Gaiotto-Tachikawa (AGT) correspondence to express the thermal trace in terms of the Alba-Fateev-Litvinov-Tarnopolskiy (AFLT) basis of descendants, which diagonalizes all charges. We analyze the GGE partition function in the thermodynamic semiclassical limit, including the first order quantum correction. We find that the equality between GGE averages and primary eigenvalues of the qBO$_{2}$ charges is attainable in the strict large $c$ limit and potentially violated at the subleading $1/c$ order. We also obtain the finite $c$ partition function when only the first non-trivial charge is turned on, expressed in terms of partial theta functions. Our results should be relevant to the eigenstate thermalization hypothesis for charged CFTs, Warped CFTs and effective field theory descriptions of condensed matter systems., Comment: 33+19 pages. v2: added comments and refs on ETH for general operators, minor text corrections

Published

2021

13. Guide to Exact Diagonalization Study of Quantum Thermalization

Author

Jung, Jung-Hoon and Noh, Jae Dong

Published

2020

14. The ergodic side of the many-body localization transition.

Author

Luitz, David J. and Lev, Yevgeny Bar

Subjects

*ERGODIC theory, *HYPOTHESIS, *STATISTICAL mechanics, *QUANTUM mechanics, *INTEGRABLE functions

Abstract

Recent studies point towards nontriviality of the ergodic phase in systems exhibiting many-body localization (MBL), which shows subexponential relaxation of local observables, subdiffusive transport and sublinear spreading of the entanglement entropy. Here we review the dynamical properties of this phase and the available numerically exact and approximate methods for its study. We discuss in which sense this phase could be considered ergodic and present possible phenomenological explanations of its dynamical properties. We close by analyzing to which extent the proposed explanations were verified by numerical studies and present the open questions in this field. [ABSTRACT FROM AUTHOR]

Published

2017

15. On Eigenstate Thermalization Hypothesis

Author

O. Inozemcev

Subjects

Physics, Nuclear and High Energy Physics, 010308 nuclear & particles physics, Mathematics::History and Overview, Observable, Computer Science::Computational Complexity, 01 natural sciences, Many body, Physics::Geophysics, Thermalisation, Quantum mechanics, 0103 physical sciences, Quantum system, Computer Science::Data Structures and Algorithms, 010306 general physics, Eigenstate thermalization hypothesis

Abstract

It is showed that one common formulation of ETH does not necessarily imply thermalization (in some sense) of an observable of isolated many body quantum system. To get such thermalization one has to postulate it in the ETH-ansatz.

Published

2020

16. Chaos and Thermalization in the Spin-Boson Dicke Model

Author

Jorge G Hirsch, Miguel Angel Bastarrachea-Magnani, David Villasenor, Saúl Pilatowsky-Cameo, Lea Santos, and Sergio Lerma-Hernandez

Subjects

Quantum Physics, Statistical Mechanics (cond-mat.stat-mech), quantum chaos, eigenstate thermalization hypothesis, quantum entanglement, FOS: Physical sciences, General Physics and Astronomy, Chaotic Dynamics (nlin.CD), Nonlinear Sciences - Chaotic Dynamics, Quantum Physics (quant-ph), Condensed Matter - Statistical Mechanics

Abstract

We present a detailed analysis of the connection between chaos and the onset of thermalization in the spin-boson Dicke model. This system has a well-defined classical limit with two degrees of freedom, and it presents both regular and chaotic regions. Our studies of the eigenstate expectation values and the distributions of the off-diagonal elements of the number of photons and the number of excited atoms validate the diagonal and off-diagonal eigenstate thermalization hypothesis (ETH) in the chaotic region, thus ensuring thermalization. The validity of the ETH reflects the chaotic structure of the eigenstates, which we corroborate using the von Neumann entanglement entropy and the Shannon entropy. Our results for the Shannon entropy also make evident the advantages of the so-called "efficient basis" over the widespread employed Fock basis when investigating the unbounded spectrum of the Dicke model. The efficient basis gives us access to a larger number of converged states than what can be reached with the Fock basis., Comment: 20 pages, 7 figures. This work is dedicated to Professor Giulio Casati on the occasion of his 80th birthday

Published

2022

17. Thermalization and its breakdown in isolated quantum systems

Author

Garrison, James Robert

Subjects

Theoretical physics, Condensed matter physics, eigenstate thermalization hypothesis, quantum mechanics, statistical mechanics, thermalization

Abstract

A very fundamental problem in quantum statistical mechanics involves whether—and how—an isolated quantum system will reach thermal equilibrium after waiting a long time. In quantum systems that do thermalize, the long-time expectation value of any “reasonable” operator will match its predicted value in the canonical ensemble. The Eigenstate Thermalization Hypothesis (ETH) posits that this thermalization occurs at the level of each individual energy eigenstate; in fact, any single eigenstate in a microcanonical energy window will predict the expectation values of such operators exactly. In the first part of this dissertation, we identify, for a generic model system, precisely which operators satisfy ETH, as well as limits to the information contained in a single eigenstate. Remarkably, our results strongly suggest that a single eigenstate can contain information about energy densities—and therefore temperatures—far away from the energy density of the eigenstate.Additionally, we study the possible breakdown of quantum thermalization in a model of itinerant electrons on a one-dimensional chain, with both spin and charge degrees of freedom. This model exhibits peculiar properties in the entanglement entropy, the apparent scaling of which is modified from a “volume law” to an “area law” after performing a partial, site-wise measurement on the system. These properties and others suggest that this model realizes a new, non-thermal phase of matter, known as a Quantum Disentangled Liquid (QDL). The putative existence of this phase has striking implications for the foundations of quantum statistical mechanics.

Published

2016

18. Off-diagonal observable elements from random matrix theory: distributions, fluctuations, and eigenstate thermalization

Author

Charlie Nation and Diego Porras

Subjects

eigenstate thermalization hypothesis, quantum non-equilibrium physics, quantum thermalization, Science, Physics, QC1-999

Abstract

We derive the eigenstate thermalization hypothesis (ETH) from a random matrix Hamiltonian by extending the model introduced by Deutsch (1991 Phys. Rev. A 43 2046). We approximate the coupling between a subsystem and a many-body environment by means of a random Gaussian matrix. We show that a common assumption in the analysis of quantum chaotic systems, namely the treatment of eigenstates as independent random vectors, leads to inconsistent results. However, a consistent approach to the ETH can be developed by introducing an interaction between random wave-functions that arises as a result of the orthonormality condition. This approach leads to a consistent form for off-diagonal matrix elements of observables. From there we obtain the scaling of time-averaged fluctuations of generic observables with system size for which we calculate an analytic form in terms of the inverse participation ratio. The analytic results are compared to exact diagonalizations of a quantum spin chain for different physical observables in multiple parameter regimes.

Published

2018

19. Information dynamics in a model with Hilbert space fragmentation

Author

Dominik Hahn, Paul A. McClarty, and David J. Luitz

Subjects

Physics, Semiclassics and chaos in quantum systems, Statistical Mechanics (cond-mat.stat-mech), Strongly Correlated Electrons (cond-mat.str-el), Heisenberg model, QC1-999, Fragmentation (computing), Hilbert space, FOS: Physical sciences, General Physics and Astronomy, Disordered Systems and Neural Networks (cond-mat.dis-nn), Quantum entanglement, Condensed Matter - Disordered Systems and Neural Networks, Conserved quantity, Condensed Matter - Strongly Correlated Electrons, Entropy (classical thermodynamics), symbols.namesake, Quantum mechanics, symbols, Condensed Matter::Strongly Correlated Electrons, Eigenstate thermalization hypothesis, Condensed Matter - Statistical Mechanics, Spin-½

Abstract

The fully frustrated ladder - a quasi-1D geometrically frustrated spin one half Heisenberg model - is non-integrable with local conserved quantities on rungs of the ladder, inducing the fragmentation of the Hilbert space into sectors composed of singlets and triplets on rungs. We explore the far-from-equilibrium dynamics of this model through the entanglement entropy and out-of-time-ordered correlators (OTOC). The post-quench dynamics of the entanglement entropy is highly anomalous as it shows clear non-damped revivals that emerge from short connected chunks of triplets and whose persistence is therefore a consequence of fragmentation. We find that the maximum value of the entropy follows from a picture where coherences between different fragments co-exist with perfect thermalization within each fragment. This means that the eigenstate thermalization hypothesis holds within all sufficiently large Hilbert space fragments. The OTOC shows short distance oscillations arising from short coupled fragments, which become decoherent at longer distances, and a sub-ballistic spreading and long distance exponential decay stemming from an emergent length scale tied to fragmentation., 12 page, 13 figures

Published

2021

20. Out-of-time-order correlations and the fine structure of eigenstate thermalization

Author

Mark T. Mitchison, John Goold, Marlon Brenes, Alessandro Silva, Silvia Pappalardi, Laboratoire de physique de l'ENS - ENS Paris (LPENS (UMR_8023)), École normale supérieure - Paris (ENS Paris), Université Paris sciences et lettres (PSL)-Université Paris sciences et lettres (PSL)-Sorbonne Université (SU)-Centre National de la Recherche Scientifique (CNRS)-Université de Paris (UP), Laboratoire de physique de l'ENS - ENS Paris (LPENS), Centre National de la Recherche Scientifique (CNRS)-Université de Paris (UP)-Sorbonne Université (SU)-École normale supérieure - Paris (ENS Paris), and Université Paris sciences et lettres (PSL)-Université Paris sciences et lettres (PSL)

Subjects

High Energy Physics - Theory, FOS: Physical sciences, 01 natural sciences, 010305 fluids & plasmas, Physics - Statistical Mechanics, 0103 physical sciences, Saturation (graph theory), correlation function, Quantum information, 010306 general physics, Eigenstate thermalization hypothesis, Condensed Matter - Statistical Mechanics, fine structure, Eigenvalues and eigenvectors, Mathematical physics, Physics, Quantum Physics, Statistical Mechanics (cond-mat.stat-mech), saturation, Order (ring theory), Observable, matrix model: random, [PHYS.PHYS.PHYS-GEN-PH]Physics [physics]/Physics [physics]/General Physics [physics.gen-ph], 3. Good health, High Energy Physics - Theory (hep-th), statistics, correlation, many-body problem, Quantum Physics (quant-ph), Random matrix, Energy (signal processing)

Abstract

Out-of-time-order correlators (OTOCs) have become established as a tool to characterise quantum information dynamics and thermalisation in interacting quantum many-body systems. It was recently argued that the expected exponential growth of the OTOC is connected to the existence of correlations beyond those encoded in the standard Eigenstate Thermalisation Hypothesis (ETH). We show explicitly, by an extensive numerical analysis of the statistics of operator matrix elements in conjunction with a detailed study of OTOC dynamics, that the OTOC is indeed a precise tool to explore the fine details of the ETH. In particular, while short-time dynamics is dominated by correlations, the long-time saturation behaviour gives clear indications of an operator-dependent energy scale $\omega_{\textrm{GOE}}$ associated to the emergence of an effective Gaussian random matrix theory. We provide an estimation of the finite-size scaling of $\omega_{\textrm{GOE}}$ for the general class of observables composed of sums of local operators in the infinite-temperature regime and found linear behaviour for the models considered., Comment: Journal version

Published

2021

21. From the eigenstate thermalization hypothesis to algebraic relaxation of OTOCs in systems with conserved quantities

Author

Dario Poletti, Vinitha Balachandran, Giuliano Benenti, and Giulio Casati

Subjects

Physics, LOCALIZATION, Conserved quantity, symbols.namesake, Aperiodic graph, STATISTICAL-MECHANICS, CONVERGENCE, CHAOS, Quantum system, symbols, QUANTUM SPECTRA, Relaxation (physics), Statistical physics, Algebraic number, Hamiltonian (quantum mechanics), Eigenstate thermalization hypothesis, Scaling

Abstract

The relaxation of out-of-time-ordered correlators (OTOCs) has been studied as a means to characterize the scrambling properties of a quantum system. We show that the presence of local conserved quantities typically results in, at the fastest, an algebraic relaxation of the OTOC provided (i) the dynamics is local and (ii) the system follows the eigenstate thermalization hypothesis. Our result relies on the algebraic scaling of the infinite-time value of OTOCs with system size, which is typical in thermalizing systems with local conserved quantities, and on the existence of finite speed of propagation of correlations for finite-range-interaction systems. We show that time independence of the Hamiltonian is not necessary as the above conditions (i) and (ii) can occur in time-dependent systems, both periodic or aperiodic. We also remark that our result can be extended to systems with power-law interactions.

Published

2021

22. Kvantnokaotični enodelčni sistemi na mreži brez prisotnosti nereda

Author

Ulčakar, Iris and Vidmar, Lev

Subjects

prepletenostna entropija, statistika energijskih nivojev, entanglement entropy, kvantni diskretni biljardi, eigenstate thermalization hypothesis, hipoteza o termalizaciji lastnih stanj, kvantni kaos, enodelčni sistemi na mreži, single-body systems on a lattice, energy spectrum statistics, quantum chaos, quantum discrete billiards

Abstract

V magistrskem delu raziskujemo, ali je enodelčni sistem fermionov na mreži v odsotnosti nereda lahko kvantnokaotičen. Obravnavanje kvantnega kaosa na mreži je namreč v raziskavah ponavadi omejeno na interagirajoče mnogodelčne sisteme in enodelčne sisteme z neredom. Ogledamo si, ali neregularne meje dvodimenzionalne mreže zlomijo kvantno integrabilnost sicer trivialnega translacijsko invariantnegamodela prostih fermionov na kvadratni mreži. V teoretičnem uvodu so opisane mere kvantnega kaosa: ujemanje spektralne statistike z napovedmi teorije naključnih matrik, oblika povprečne von Neumannove in 2. Rényijeve prepletenostne entropije mnogodelčnih stanj ter ujemanje oblike matričnih elementov preprostih opazljivk z napovedmi hipoteze termalizacije lastnih stanj. Definirani so diskretni biljardni sistemi - enodelčni sistemi fermionov na dvodimenzionalni mreži z mejo - in opisane njihove splošne lastnosti. Uvedemo tri diskretne biljarde, ki so v zvezni limiti tako klasično- kot kvantnokaotični, in za njih preverimo predstavljene mere za kvantnikaos. In this thesis we aim to show that single-body fermionic systems on a lattice can exhibit quantum chaotic behaviour. Up until now, quantum chaos on a lattice was usually studied only for interacting many-body systems and single-body systems with disorder. We investigate whether irregular boundaries of a two-dimensional lattice break the integrability of the translationally invariant free fermion model on a square lattice. In the first part of the thesis we describe the measures of quantum chaos: the agreement of eigenstate statistics with random matrix predictions, the form of the average von Neumann and 2. Rényi entanglement entropy of many-body Hamiltonian eigenstates, and the agreement of the form of the matrix elements of local observables with the eigenstate thermalization hypothesis ansatz. We define discrete billiard systems - single-body fermionic systems on a two-dimensional lattice with a boundary - and describe their generic properties. I introduce three discrete billiards, which are classically chaotic as well as quantum chaotic in their continuous limit, and test the measures of quantum chaos for them.

Published

2021

23. Thermalization and Its Absence within Krylov Subspaces of a Constrained Hamiltonian

Author

Rahul Nandkishore, Abhinav Prem, Nicolas Regnault, Sanjay Moudgalya, and B. Andrei Bernevig

Subjects

Physics, Integrable system, 010308 nuclear & particles physics, Quantum dynamics, Hilbert space, Krylov subspace, Invariant (physics), 01 natural sciences, Linear subspace, Theoretical physics, symbols.namesake, 0103 physical sciences, symbols, 010306 general physics, Hamiltonian (quantum mechanics), Eigenstate thermalization hypothesis

Abstract

We study the quantum dynamics of a simple translation invariant, center-of-mass (CoM) preserving model of interacting fermions in one dimension (1D), which arises in multiple experimentally realizable contexts. We show that this model naturally displays the phenomenology associated with fractonic systems, wherein single charges can only move by emitting dipoles. This allows us to demonstrate the rich Krylov fractured structure of this model, whose Hilbert space shatters into exponentially many dynamically disconnected subspaces. Focusing on exponentially large Krylov subspaces, we show that these can be either be integrable or non-integrable, thereby establishing the notion of Krylov-restricted thermalization. We analytically find a tower of integrable Krylov subspaces of this Hamiltonian, all of which map onto spin-1/2 XX models of various system sizes. We also discuss the physics of the non-integrable subspaces, where we show evidence for weak Eigenstate Thermalization Hypothesis (ETH) restricted to each non-integrable Krylov subspace. Further, we show that constraints in some of the thermal Krylov subspaces cause the long-time expectation values of local operators to deviate from behavior typically expected from translation-invariant systems. Finally, we show using a Schrieffer-Wolff transformation that such models naturally appear as effective Hamiltonians in the large electric field limit of the interacting Wannier-Stark problem, and comment on connections of our work with the phenomenon of Bloch many-body localization.

Published

2021

24. Distinguishing Random and Black Hole Microstates

Author

Shinsei Ryu, Jonah Kudler-Flam, and Vladimir Narovlansky

Subjects

Wishart distribution, Physics, High Energy Physics - Theory, Quantum Physics, Kullback–Leibler divergence, Statistical Mechanics (cond-mat.stat-mech), Entropy (statistical thermodynamics), General Engineering, FOS: Physical sciences, Black hole, General Relativity and Quantum Cosmology, High Energy Physics - Theory (hep-th), General Earth and Planetary Sciences, Statistical physics, Tensor, Wormhole, Quantum Physics (quant-ph), Eigenstate thermalization hypothesis, Condensed Matter - Statistical Mechanics, General Environmental Science, Hawking radiation

Abstract

This is an expanded version of the short report [Phys. Rev. Lett. 126, 171603 (2021)], where the relative entropy was used to distinguish random states drawn from the Wishart ensemble as well as black hole microstates. In this work, we expand these ideas by computing many generalizations including the Petz R\'enyi relative entropy, sandwiched R\'enyi relative entropy, fidelities, and trace distances. These generalized quantities are able to teach us about new structures in the space of random states and black hole microstates where the von Neumann and relative entropies were insufficient. We further generalize to generic random tensor networks where new phenomena arise due to the locality in the networks. These phenomena sharpen the relationship between holographic states and random tensor networks. We discuss the implications of our results on the black hole information problem using replica wormholes, specifically the state dependence (hair) in Hawking radiation. Understanding the differences between Hawking radiation of distinct evaporating black holes is an important piece of the information problem that was not addressed by entropy calculations using the island formula. We interpret our results in the language of quantum hypothesis testing and the subsystem eigenstate thermalization hypothesis (ETH), deriving that chaotic (including holographic) systems obey subsystem ETH for all subsystems less than half the total system size., Comment: 57 pages

Published

2021

25. Eigenstate thermalization hypothesis through the lens of autocorrelation functions

Author

Christoph Schönle, Fabian Heidrich-Meisner, David Jansen, and Lev Vidmar

Subjects

Physics, Quantum Physics, Statistical Mechanics (cond-mat.stat-mech), Strongly Correlated Electrons (cond-mat.str-el), FOS: Physical sciences, Observable, 02 engineering and technology, Fermion, 021001 nanoscience & nanotechnology, 01 natural sciences, Omega, Condensed Matter - Strongly Correlated Electrons, Lattice (order), 0103 physical sciences, Quantum Physics (quant-ph), 010306 general physics, 0210 nano-technology, Eigenstate thermalization hypothesis, Quantum, Condensed Matter - Statistical Mechanics, Eigenvalues and eigenvectors, Ansatz, Mathematical physics

Abstract

Matrix elements of observables in eigenstates of generic Hamiltonians are described by the Srednicki ansatz within the eigenstate thermalization hypothesis (ETH). We study a quantum chaotic spin-fermion model in a one-dimensional lattice, which consists of a spin-1/2 XX chain coupled to a single itinerant fermion. In our study, we focus on translationally invariant observables including the charge and energy current, thereby also connecting the ETH with transport properties. Considering observables with a Hilbert-Schmidt norm of one, we first perform a comprehensive analysis of ETH in the model taking into account latest developments. A particular emphasis is on the analysis of the structure of the offdiagonal matrix elements $|\langle \alpha | \hat O | \beta \rangle|^2$ in the limit of small eigenstate energy differences $\omega = E_\beta - E_\alpha$. Removing the dominant exponential suppression of $|\langle \alpha | \hat O | \beta \rangle|^2$, we find that: (i) the current matrix elements exhibit a system-size dependence that is different from other observables under investigation, (ii) matrix elements of several other observables exhibit a Drude-like structure with a Lorentzian frequency dependence. We then show how this information can be extracted from the autocorrelation functions as well. Finally, our study is complemented by a numerical analysis of the fluctuation-dissipation relation for eigenstates in the bulk of the spectrum. We identify the regime of $\omega$ in which the well-known fluctuation-dissipation relation is valid with high accuracy for finite systems., Comment: v3: Data shown in figures now available as ancillary files

Published

2021

26. Frustration-induced emergent Hilbert space fragmentation

Author

Kyungmin Lee, Hitesh J. Changlani, and Arijeet Pal

Subjects

Thermal equilibrium, Physics, Quantum Physics, Strongly Correlated Electrons (cond-mat.str-el), Quantum dynamics, media_common.quotation_subject, Hilbert space, FOS: Physical sciences, Frustration, 02 engineering and technology, 021001 nanoscience & nanotechnology, 01 natural sciences, Condensed Matter - Strongly Correlated Electrons, symbols.namesake, Classical mechanics, Lattice (order), 0103 physical sciences, symbols, Quantum Physics (quant-ph), 010306 general physics, 0210 nano-technology, Hamiltonian (quantum mechanics), Quantum, Eigenstate thermalization hypothesis, media_common

Abstract

Although most quantum systems thermalize locally on short timescales independent of initial conditions, recent developments have shown this is not always the case. Lattice geometry and quantum mechanics can conspire to produce constrained quantum dynamics and associated glassy behavior, a phenomenon that falls outside the rubric of the eigenstate thermalization hypothesis. Constraints ``fragment'' the many-body Hilbert space due to which some states remain insulated from others and the system fails to attain thermal equilibrium. Such fragmentation is a hallmark of geometrically frustrated magnets with low-energy ``icelike manifolds'' exhibiting a broad range of relaxation times for different initial states. Focusing on the highly frustrated kagome lattice, we demonstrate these phenomena in the Balents-Fisher-Girvin Hamiltonian (easy-axis regime), and a three-coloring model (easy-plane regime), both with constrained Hilbert spaces. We study their level statistics and relaxation dynamics to develop a coherent picture of fragmentation in various limits of the XXZ model on the kagome lattice.

Published

2021

27. Quantum quenches and thermalization in SYK models

Author

Ritabrata Bhattacharya, Dileep P. Jatkar, and Nilakash Sorokhaibam

Subjects

High Energy Physics - Theory, Physics, Nuclear and High Energy Physics, 010308 nuclear & particles physics, Field Theories in Lower Dimensions, Ergodicity, FOS: Physical sciences, 1/N Expansion, Fermion, 1/N expansion, AdS-CFT Correspondence, 01 natural sciences, Holography and condensed matter physics (AdS/CMT), AdS/CFT correspondence, Thermalisation, High Energy Physics - Theory (hep-th), Mixing (mathematics), Quantum mechanics, 0103 physical sciences, lcsh:QC770-798, lcsh:Nuclear and particle physics. Atomic energy. Radioactivity, 010306 general physics, Quantum, Eigenstate thermalization hypothesis

Abstract

We study non-equilibrium dynamics in SYK models using quantum quench. We consider models with two, four, and higher fermion interactions ($q=2, 4$, and higher) and use two different types of quench protocol, which we call step and bump quenches. We analyse evolution of fermion two-point functions without long time averaging. We observe that in $q=2$ theory the two-point functions do not thermalize. We find thermalization in $q=4$ and higher theories without long time averaging. We calculate two different exponents of which one is equal to the coupling and the other is proportional to the final temperature. This result is more robust than thermalization obtained from long time averaging as proposed by the eigenstate thermalization hypothesis(ETH). Thermalization achieved without long time averaging is more akin to mixing than ergodicity., Comment: Published version + some minor corrections

Published

2019

28. Multiple quantum scar states and emergent slow-thermalization in the flat-band system

Author

Yasuhiro Hatsugai, Yoshihito Kuno, and Tomonari Mizoguchi

Subjects

Physics, Statistical Mechanics (cond-mat.stat-mech), Entropy (statistical thermodynamics), Degenerate energy levels, FOS: Physical sciences, Quantum entanglement, State (functional analysis), Disordered Systems and Neural Networks (cond-mat.dis-nn), Condensed Matter - Disordered Systems and Neural Networks, Quantum mechanics, Degeneracy (mathematics), Scaling, Eigenstate thermalization hypothesis, Quantum, Condensed Matter - Statistical Mechanics

Abstract

Quantum many-body scars (QMBS) appear in a flat-band model with interactions on the saw-tooth lattice. The flat-band model includes a compact support localized eigenstates, called compact localized state (CLS). Some characteristic many-body states can be constructed from the CLSs at a low-filling on the flat-band. These many-body states are degenerate. Starting with such degenerate states we concretely show how to construct multiple QMBSs with different eigenenergies embedded in the entire spectrum. If the degeneracy is lifted by introducing hopping modulation or weak perturbations, these states lifted by these ways can be viewed as multiple QMBSs. In this work, we focus on the study of the perturbation-induced QMBS. Perturbed states, which are connected to the exact QMBSs in the unperturbed limit, indicate common properties of conventional QMBS systems, that is, a subspace with sub-volume or area law scaling entanglement entropy, which indicates the violation of the strong eigenstate thermalization hypothesis (ETH). Also for a specific initial state, slow-thermalization dynamics appears. We numerically demonstrate these subjects. The flat-band model with interactions is a characteristic example in non-integrable systems with the violation of the strong ETH and the QMBS., 13 pages, 9 figures

Published

2021

29. Eigenstate Thermalisation on Average

Author

Oliver Cohen, Joe Dunlop, and Anthony J. Short

Subjects

Physics, Condensed Matter::Quantum Gases, Quantum Physics, Statistical Mechanics (cond-mat.stat-mech), Thermodynamic equilibrium, Component (thermodynamics), FOS: Physical sciences, Bristol Quantum Information Institute, Thermalisation, Quantum mechanics, Thermal, Quantum system, Necessity and sufficiency, Quantum Physics (quant-ph), Eigenstate thermalization hypothesis, Eigenvalues and eigenvectors, Condensed Matter - Statistical Mechanics

Abstract

We consider conditions under which an isolated quantum system approaches a microcanonical equilibrium state. A key component is the eigenstate thermalisation hypothesis, which proposes that all energy eigenstates appear thermal. We introduce a weaker version of this requirement, applying only to the average distinguishability of eigenstates from the thermal state, and investigate its necessity and sufficiency for thermalisation., 9 pages

Published

2021

30. Multifractality and Fock-space localization in many-body localized states: one-particle density matrix perspective

Author

Ken-Ichiro Imura and Takahiro Orito

Subjects

Physics, Density matrix, Degree (graph theory), Dimension (graph theory), Spectrum (functional analysis), FOS: Physical sciences, 02 engineering and technology, Disordered Systems and Neural Networks (cond-mat.dis-nn), Condensed Matter - Disordered Systems and Neural Networks, 021001 nanoscience & nanotechnology, 01 natural sciences, Fock space, Matrix (mathematics), Distribution (mathematics), 0103 physical sciences, 010306 general physics, 0210 nano-technology, Eigenstate thermalization hypothesis, Mathematical physics

Abstract

Many-body localization (MBL) is well characterized in Fock space. To quantify the degree of this Fock space localization, the multifractal dimension $D_q$ is employed; it has been claimed that $D_q$ shows a jump from the delocalized value $D_q=1$ in the ETH phase (ETH: eigenstate thermalization hypothesis) to a smaller value $0, Comment: 19 pages, 8 figures, Phys. Rev. B in press

Published

2021

31. Eigenstate thermalization in dual-unitary quantum circuits: Asymptotics of spectral functions

Author

Felix Fritzsch and Tomaž Prosen

Subjects

High Energy Physics - Theory, Distribution (number theory), Gaussian, Second moment of area, FOS: Physical sciences, 01 natural sciences, 010305 fluids & plasmas, Matrix (mathematics), symbols.namesake, 0103 physical sciences, Statistical physics, 010306 general physics, Eigenstate thermalization hypothesis, Quantum, Eigenvalues and eigenvectors, Condensed Matter - Statistical Mechanics, Physics, Quantum Physics, Statistical Mechanics (cond-mat.stat-mech), Expression (computer science), Nonlinear Sciences - Chaotic Dynamics, 3. Good health, High Energy Physics - Theory (hep-th), symbols, Chaotic Dynamics (nlin.CD), Quantum Physics (quant-ph)

Abstract

The eigenstate thermalization hypothesis provides to date the most successful description of thermalization in isolated quantum systems by conjecturing statistical properties of matrix elements of typical operators in the (quasi-)energy eigenbasis. Here we study the distribution of matrix elements for a class of operators in dual-unitary quantum circuits in dependence of the frequency associated with the corresponding eigenstates. We provide an exact asymptotic expression for the spectral function, i.e., the second moment of this frequency resolved distribution. The latter is obtained from the decay of dynamical correlations between local operators which can be computed exactly from the elementary building blocks of the dual-unitary circuits. Comparing the asymptotic expression with results obtained by exact diagonalization we find excellent agreement. Small fluctuations at finite system size are explicitly related to dynamical correlations at intermediate times and the deviations from their asymptotical dynamics. Moreover, we confirm the expected Gaussian distribution of the matrix elements by computing higher moments numerically., 15 pages, 7 figures

Published

2021

32. Open quantum systems in thermal nonergodic environments

Author

Carlos A. Parra-Murillo, Max Bramberger, Inés de Vega, and Claudius Hubig

Subjects

Superconductivity, Physics, Quantum Physics, Markov chain, FOS: Physical sciences, 01 natural sciences, Open system (systems theory), 010305 fluids & plasmas, Qubit, 0103 physical sciences, Thermal, Statistical physics, Quantum Physics (quant-ph), 010306 general physics, Eigenstate thermalization hypothesis, Quantum

Abstract

The dynamics of an open system crucially depends on the correlation function of its environment, $C_B(t)$. We show that for thermal non-Harmonic environments $C_B(t)$ may not decay to zero but to an offset, $C_0>0$. The presence of such offset is determined by the environment eigenstate structure, and whether it fulfills or not the eigenstate thermalization hypothesis. Moreover, we show that a $C_0>0$ could render the weak coupling approximation inaccurate and prevent the open system to thermalize. Finally, for a realistic environment of dye molecules, we show the emergence of the offset by using matrix product states (MPS), and discuss its link to a 1/f noise spectrum that, in contrast to previous models, extends to zero frequencies. Thus, our results may be relevant in describing dissipation in quantum technological devices like superconducting qubits, which are known to be affected by such noise., 4 pages, 1 figure, plus suplementary material

Published

2021

33. Chaos and Thermalization in the Spin-Boson Dicke Model.

Author

Villaseñor D, Pilatowsky-Cameo S, Bastarrachea-Magnani MA, Lerma-Hernández S, Santos LF, and Hirsch JG

Abstract

We present a detailed analysis of the connection between chaos and the onset of thermalization in the spin-boson Dicke model. This system has a well-defined classical limit with two degrees of freedom, and it presents both regular and chaotic regions. Our studies of the eigenstate expectation values and the distributions of the off-diagonal elements of the number of photons and the number of excited atoms validate the diagonal and off-diagonal eigenstate thermalization hypothesis (ETH) in the chaotic region, thus ensuring thermalization. The validity of the ETH reflects the chaotic structure of the eigenstates, which we corroborate using the von Neumann entanglement entropy and the Shannon entropy. Our results for the Shannon entropy also make evident the advantages of the so-called "efficient basis" over the widespread employed Fock basis when investigating the unbounded spectrum of the Dicke model. The efficient basis gives us access to a larger number of converged states than what can be reached with the Fock basis.

Published

2022

34. The Hubbard Model

Author

Hui Zhai

Subjects

Quantum phase transition, Physics, symbols.namesake, Hubbard model, Mott insulator, Quantum mechanics, symbols, Spin density wave, Critical exponent, Higgs mechanism, Charge density wave, Eigenstate thermalization hypothesis

Published

2021

35. Orthogonal Quantum Many-body Scars

Author

Hongzheng Zhao, Adam Smith, Johannes Knolle, and Florian Mintert

Subjects

Physics, Quantum Physics, Statistical Mechanics (cond-mat.stat-mech), Strongly Correlated Electrons (cond-mat.str-el), Entropy (statistical thermodynamics), General Physics and Astronomy, Non-equilibrium thermodynamics, FOS: Physical sciences, Observable, Quantum entanglement, Minimal model, Condensed Matter - Strongly Correlated Electrons, Quantum Gases (cond-mat.quant-gas), Statistical physics, Quantum ergodicity, Quantum Physics (quant-ph), Condensed Matter - Quantum Gases, Quantum, Eigenstate thermalization hypothesis, Condensed Matter - Statistical Mechanics

Abstract

Quantum many-body scars have been put forward as counterexamples to the Eigenstate Thermalization Hypothesis. These atypical states are observed in a range of correlated models as long-lived oscillations of local observables in quench experiments starting from selected initial states. The long-time memory is a manifestation of quantum non-ergodicity generally linked to a sub-extensive generation of entanglement entropy, the latter of which is widely used as a diagnostic for identifying quantum many-body scars numerically as low entanglement outliers. Here we show that, by adding kinetic constraints to a fractionalized orthogonal metal, we can construct a minimal model with orthogonal quantum many-body scars leading to persistent oscillations with infinite lifetime coexisting with rapid volume-law entanglement generation. Our example provides new insights into the link between quantum ergodicity and many-body entanglement while opening new avenues for exotic non-equilibrium dynamics in strongly correlated multi-component quantum systems., 5 pages + 4 figures

Published

2021

36. Relative Entropy of Random States and Black Holes

Author

Jonah Kudler-Flam

Subjects

High Energy Physics - Theory, Physics, Wishart distribution, Quantum Physics, Kullback–Leibler divergence, Statistical Mechanics (cond-mat.stat-mech), Strongly Correlated Electrons (cond-mat.str-el), General Physics and Astronomy, FOS: Physical sciences, Context (language use), Mathematical Physics (math-ph), 01 natural sciences, Black hole, Condensed Matter - Strongly Correlated Electrons, High Energy Physics - Theory (hep-th), Quantum state, 0103 physical sciences, 010306 general physics, Quantum Physics (quant-ph), Random matrix, Eigenstate thermalization hypothesis, Condensed Matter - Statistical Mechanics, Mathematical Physics, Eigenvalues and eigenvectors, Mathematical physics

Abstract

We study the relative entropy of highly excited quantum states. First, we sample states from the Wishart ensemble and develop a large-N diagrammatic technique for the relative entropy. The solution is exactly expressed in terms of elementary functions. We compare the analytic results to small-N numerics, finding precise agreement. Furthermore, the random matrix theory results accurately match the behavior of chaotic many-body eigenstates, a manifestation of eigenstate thermalization. We apply this formalism to the AdS/CFT correspondence where the relative entropy measures the distinguishability between different black hole microstates. We find that black hole microstates are distinguishable even when the observer has arbitrarily small access to the quantum state, though the distinguishability is nonperturbatively small in Newton's constant. Finally, we interpret these results in the context of the subsystem Eigenstate Thermalization Hypothesis (sETH), concluding that holographic systems obey sETH up to subsystems half the size of the total system., Comment: 5+3 pages; v2: two appendices, discussion of implications for quantum hypothesis testing, and references added

Published

2021

37. Many-body scar state intrinsic to periodically driven system

Author

Sho Sugiura, Keiji Saito, and Tomotaka Kuwahara

Subjects

Physics, Floquet theory, Classical mechanics, State (functional analysis), Construct (philosophy), Eigenstate thermalization hypothesis, Many body

Abstract

The authors construct periodically-driven many-body systems which do not satisfy the Floquet version of eigenstate thermalization hypothesis.

Published

2021

38. From many-body oscillations to thermalization in an isolated spinor gas

Author

An Qu, Jean Dalibard, Bertrand Evrard, Fabrice Gerbier, Chaire Atomes et rayonnement, Laboratoire Kastler Brossel (LKB [Collège de France]), École normale supérieure - Paris (ENS Paris), Université Paris sciences et lettres (PSL)-Université Paris sciences et lettres (PSL)-Centre National de la Recherche Scientifique (CNRS)-Fédération de recherche du Département de physique de l'Ecole Normale Supérieure - ENS Paris (FRDPENS), Université Paris sciences et lettres (PSL)-Université Paris sciences et lettres (PSL)-Centre National de la Recherche Scientifique (CNRS)-Centre National de la Recherche Scientifique (CNRS)-Sorbonne Université (SU)-Collège de France (CdF (institution))-École normale supérieure - Paris (ENS Paris), and Université Paris sciences et lettres (PSL)-Université Paris sciences et lettres (PSL)-Centre National de la Recherche Scientifique (CNRS)-Centre National de la Recherche Scientifique (CNRS)-Sorbonne Université (SU)-Collège de France (CdF (institution))

Subjects

Physics, Spinor, [PHYS.COND.GAS]Physics [physics]/Condensed Matter [cond-mat]/Quantum Gases [cond-mat.quant-gas], Spectrum (functional analysis), Chaotic, General Physics and Astronomy, FOS: Physical sciences, Observable, 01 natural sciences, Nonlinear system, symbols.namesake, Thermalisation, Classical mechanics, [PHYS.QPHY]Physics [physics]/Quantum Physics [quant-ph], Quantum Gases (cond-mat.quant-gas), 0103 physical sciences, symbols, [SPI.OPTI]Engineering Sciences [physics]/Optics / Photonic, 010306 general physics, Hamiltonian (quantum mechanics), Condensed Matter - Quantum Gases, Eigenstate thermalization hypothesis

Abstract

The dynamics of a many-body system can take many forms, from a purely reversible evolution to fast thermalization. Here we show experimentally and numerically that an assembly of spin 1 atoms all in the same spatial mode allows one to explore this wide variety of behaviors. When the system can be described by a Bogoliubov analysis, the relevant energy spectrum is linear and leads to undamped oscillations of many-body observables. Outside this regime, the non-linearity of the spectrum leads to irreversibity, characterized by a universal behavior. When the integrability of the Hamiltonian is broken, a chaotic dynamics emerges and leads to thermalization, in agreement with the Eigenstate Thermalization Hypothesis paradigm., Supplementary material available as ancillary file

Published

2021

39. Eigenstate Thermalization Hypothesis for Wigner Matrices

Author

László Erdős, Dominik Schröder, and Giorgio Cipolloni

Subjects

Physics, Ergodicity, Probability (math.PR), FOS: Physical sciences, Statistical and Nonlinear Physics, Mathematical Physics (math-ph), Matrix (mathematics), Thermalisation, 60B20, 15B52, 58J51, 81Q50, Rate of convergence, Quantum system, FOS: Mathematics, Eigenstate thermalization hypothesis, Quantum, Eigenvalues and eigenvectors, Mathematics - Probability, Mathematical Physics, Mathematical physics

Abstract

We prove that any deterministic matrix is approximately the identity in the eigenbasis of a large random Wigner matrix with very high probability and with an optimal error inversely proportional to the square root of the dimension. Our theorem thus rigorously verifies the Eigenstate Thermalization Hypothesis by Deutsch [Deutsch 1991 ] for the simplest chaotic quantum system, the Wigner ensemble. In mathematical terms, we prove the strong form of Quantum Unique Ergodicity (QUE) with an optimal convergence rate for all eigenvectors simultaneously, generalizing previous probabilistic QUE results in [Bourgade, Yau 2017 ] and [Bourgade, Yau, Yin 2020 ] ., Communications in Mathematical Physics, 388 (2), ISSN:1432-0916, ISSN:0010-3616

Published

2021

40. Motif magnetism and quantum many-body scars

Author

Eli Chertkov and Bryan K. Clark

Subjects

Physics, Quantum Physics, Strongly Correlated Electrons (cond-mat.str-el), Statistical Mechanics (cond-mat.stat-mech), Magnetism, FOS: Physical sciences, Polyhedron, Condensed Matter - Strongly Correlated Electrons, Quantum mechanics, Lattice (order), Antiferromagnetism, Spin (physics), Quantum Physics (quant-ph), Quantum, Eigenstate thermalization hypothesis, Eigenvalues and eigenvectors, Condensed Matter - Statistical Mechanics

Abstract

We generally expect quantum systems to thermalize and satisfy the eigenstate thermalization hypothesis (ETH), which states that finite energy density eigenstates are thermal. However, some systems, such as many-body localized systems and systems with quantum many-body scars, violate ETH and have high-energy athermal eigenstates. In systems with scars, most eigenstates thermalize, but a few atypical scar states do not. Scar states can give rise to a periodic revival when time-evolving particular initial product states, which can be detected experimentally. Recently, a family of spin Hamiltonians was found with magnetically ordered 3-colored eigenstates that are quantum many-body scars [Lee et al. Phys. Rev. B 101, 241111(2020)]. These models can be realized in any lattice that can be tiled by triangles, such as the triangular or kagome lattices, and have been shown to have close connections to the physics of quantum spin liquids in the Heisenberg kagome antiferromagnet. In this work, we introduce a generalized family of $n$-colored Hamiltonians with "spiral colored" eigenstates made from $n$-spin motifs such as polygons or polyhedra. We show how these models can be realized in many different lattice geometries and provide numerical evidence that they can exhibit quantum many-body scars with periodic revivals that can be observed by time-evolving simple product states. The simple structure of these Hamiltonians makes them promising candidates for future experimental studies of quantum many-body scars., Comment: 10 pages, 11 figures, 1 table

Published

2021

41. Symmetry-prohibited thermalization after a quantum quench

Author

Peter Reimann

Subjects

Statistics and Probability, Physics, Statistical Mechanics (cond-mat.stat-mech), quantum thermalization, High Energy Physics::Lattice, FOS: Physical sciences, Statistical and Nonlinear Physics, Observable, quantum quenches, Symmetry (physics), Quantum mechanics, Thermodynamic limit, Initial value problem, Statistics, Probability and Uncertainty, Quantum, Eigenstate thermalization hypothesis, Hamiltonian (control theory), Condensed Matter - Statistical Mechanics, Spin-½

Abstract

The observable long-time behavior of an isolated many-body system after a quantum quench is considered, i.e., an eigenstate (or an equilibrium ensemble) of some pre-quench Hamiltonian $H$ serves as initial condition which then evolves in time according to some post-quench Hamiltonian $H_p$. Absence of thermalization is analytically demonstrated for a large class of quite common pre- and post-quench spin Hamiltonians. The main requirement is that the pre-quench Hamiltonian must exhibit a $Z_2$ (spin-flip) symmetry, which would be spontaneously broken in the thermodynamic limit, though we actually focus on finite (but large) systems. On the other hand, the post-quench Hamiltonian must violate the $Z_2$ symmetry, but for the rest may be non-integrable and may obey the eigenstate thermalization hypothesis for (sums of) few-body observables.

Published

2021

42. Transport in the nonergodic extended phase of interacting quasiperiodic systems

Author

Subroto Mukerjee, Soumi Ghosh, and Jyotsna Gidugu

Subjects

Physics, Statistical Mechanics (cond-mat.stat-mech), Strongly Correlated Electrons (cond-mat.str-el), FOS: Physical sciences, Charge (physics), Disordered Systems and Neural Networks (cond-mat.dis-nn), 02 engineering and technology, Fermion, Condensed Matter - Disordered Systems and Neural Networks, 021001 nanoscience & nanotechnology, 01 natural sciences, Omega, Condensed Matter - Strongly Correlated Electrons, Quantum mechanics, Phase (matter), Quasiperiodic function, 0103 physical sciences, Quantum system, 010306 general physics, 0210 nano-technology, Eigenstate thermalization hypothesis, Condensed Matter - Statistical Mechanics, Eigenvalues and eigenvectors

Abstract

We study the transport properties and the spectral statistics of a one-dimensional closed quantum system of interacting spinless fermions in a quasiperiodic potential which produces a single particle mobility edge in the absence of interaction. For such systems, it has been shown that the many body eigenstates can be of three different kinds: extended and ETH (eigenstate thermalization hypothesis) obeying (thermal), localized and ETH violating (many body localized) and extended and ETH violating (non-ergodic extended). Here we investigate the non-ergodic extended phase from the point of view of level spacing statistics and charge transport. We calculate the dc conductivity and the low frequency conductivity $\sigma(\omega)$ and show that both are consistent with sub-diffusive transport. This is contrasted with diffusive transport in the thermal phase and blocked transport in the MBL phase., Comment: 9 pages, 7 figures

Published

2020

43. Extended nonergodic regime and spin subdiffusion in disordered SU(2)-symmetric Floquet systems

Author

Stuart Nicholls, Meng Cheng, and Zhi-Cheng Yang

Subjects

Physics, Floquet theory, Quantum Physics, Statistical Mechanics (cond-mat.stat-mech), Strongly Correlated Electrons (cond-mat.str-el), Quantum dynamics, FOS: Physical sciences, Disordered Systems and Neural Networks (cond-mat.dis-nn), 02 engineering and technology, Quantum entanglement, Expectation value, Condensed Matter - Disordered Systems and Neural Networks, 021001 nanoscience & nanotechnology, 01 natural sciences, Condensed Matter - Strongly Correlated Electrons, Quantum mechanics, 0103 physical sciences, Quantum Physics (quant-ph), 010306 general physics, 0210 nano-technology, Random matrix, Eigenstate thermalization hypothesis, Condensed Matter - Statistical Mechanics, Special unitary group, Spin-½

Abstract

We explore thermalization and quantum dynamics in a one-dimensional disordered SU(2)-symmetric Floquet model, where a many-body localized phase is prohibited by the non-abelian symmetry. Despite the absence of localization, we find an extended nonergodic regime at strong disorder where the system exhibits nonthermal behaviors. In the strong disorder regime, the level spacing statistics exhibit neither a Wigner-Dyson nor a Poisson distribution, and the spectral form factor does not show a linear-in-time growth at early times characteristic of random matrix theory. The average entanglement entropy of the Floquet eigenstates is subthermal, although violating an area-law scaling with system sizes. We further compute the expectation value of local observables and find strong deviations from the eigenstate thermalization hypothesis. The infinite temperature spin autocorrelation function decays at long times as $t^{-\beta}$ with $\beta < 0.5$, indicating subdiffusive transport at strong disorders., Comment: updated to accepted version

Published

2020

44. Eigenstate thermalization scaling in approaching the classical limit

Author

Masudul Haque and Goran Nakerst

Subjects

Physics, Quantum Physics, Semiclassics and chaos in quantum systems, Statistical Mechanics (cond-mat.stat-mech), Hilbert space, Semiclassical physics, FOS: Physical sciences, Observable, 01 natural sciences, Classical limit, 010305 fluids & plasmas, symbols.namesake, Quantum mechanics, Lattice (order), 0103 physical sciences, symbols, Exponent, 010306 general physics, Quantum Physics (quant-ph), Eigenstate thermalization hypothesis, Scaling, Condensed Matter - Statistical Mechanics

Abstract

According to the eigenstate thermalization hypothesis (ETH), the eigenstate-to-eigenstate fluctuations of expectation values of local observables should decrease with increasing system size. In approaching the thermodynamic limit - the number of sites and the particle number increasing at the same rate - the fluctuations should scale as $\sim D^{-1/2}$ with the Hilbert space dimension $D$. Here, we study a different limit - the classical or semiclassical limit - by increasing the particle number in fixed lattice topologies. We focus on the paradigmatic Bose-Hubbard system, which is quantum-chaotic for large lattices and shows mixed behavior for small lattices. We derive expressions for the expected scaling, assuming ideal eigenstates having Gaussian-distributed random components. We show numerically that, for larger lattices, ETH scaling of physical mid-spectrum eigenstates follows the ideal (Gaussian) expectation, but for smaller lattices, the scaling occurs via a different exponent. We examine several plausible mechanisms for this anomalous scaling., 17 pages, 9 figures

Published

2020

45. RELATIONSHIP BETWEEN CHAOS AND THERMALIZATION IN ONE-DIMENSIONAL QUANTUM MANY-BODY SYSTEMS.

Author

SANTOS, LEA F. and RIGOL, MARCOS

Subjects

*THERMAL neutrons, *QUANTUM chaos, *QUANTUM mechanics, *OPTICAL lattices, *BOSE-Einstein condensation

Published

2011

46. Exact many-body scars and their stability in constrained quantum chains

Author

Federica Maria Surace, Eduardo Gonzalez Lazo, Matteo Votto, Giuliano Giudici, Alessandro Silva, and Marcello Dalmonte

Subjects

FOS: Physical sciences, 02 engineering and technology, Quantum entanglement, 01 natural sciences, symbols.namesake, Physics - Statistical Mechanics, Quantum mechanics, 0103 physical sciences, Entropy (information theory), 010306 general physics, Eigenstate thermalization hypothesis, Quantum, Scaling, Eigenvalues and eigenvectors, Condensed Matter - Statistical Mechanics, Physics, Quantum Physics, Statistical Mechanics (cond-mat.stat-mech), 021001 nanoscience & nanotechnology, Matrix multiplication, Quantum Gases (cond-mat.quant-gas), Rydberg formula, symbols, Quantum Physics (quant-ph), 0210 nano-technology, Condensed Matter - Quantum Gases, cond-mat.quant-gas

Abstract

Quantum scars are non-thermal eigenstates characterized by low entanglement entropy, initially detected in systems subject to nearest-neighbor Rydberg blockade, the so called PXP model. While most of these special eigenstates elude an analytical description and seem to hybridize with nearby thermal eigenstates for large systems, some of them can be written as matrix product states (MPS) with size-independent bond dimension. We study the response of these exact quantum scars to perturbations by analysing the scaling of the fidelity susceptibility with system size. We find that some of them are anomalously stable at first order in perturbation theory, in sharp contrast to the eigenstate thermalization hypothesis. However, this stability seems to breakdown when all orders are taken into account. We further investigate models with larger blockade radius and find a novel set of exact quantum scars, that we write down analytically and compare with the PXP exact eigenstates. We show that they exhibit the same robustness against perturbations at first order., 15 pages, 8 figures

Published

2020

47. Flat Band Quantum Scar

Author

Tomonari Mizoguchi, Yasuhiro Hatsugai, and Yoshihito Kuno

Subjects

Crystal system, FOS: Physical sciences, 02 engineering and technology, Sawtooth wave, 01 natural sciences, Condensed Matter - Strongly Correlated Electrons, Quantum mechanics, 0103 physical sciences, Energy spectrum, 010306 general physics, Quantum, Eigenstate thermalization hypothesis, Eigenvalues and eigenvectors, Condensed Matter - Statistical Mechanics, Physics, Condensed Matter - Materials Science, Statistical Mechanics (cond-mat.stat-mech), Strongly Correlated Electrons (cond-mat.str-el), Materials Science (cond-mat.mtrl-sci), State (functional analysis), Disordered Systems and Neural Networks (cond-mat.dis-nn), Condensed Matter - Disordered Systems and Neural Networks, 021001 nanoscience & nanotechnology, Nonlinear Sciences::Chaotic Dynamics, Quantum Gases (cond-mat.quant-gas), Flat band, 0210 nano-technology, Condensed Matter - Quantum Gases

Abstract

We show that a quantum scar state, an atypical eigenstate breaking eigenstate thermalization hypothesis embedded in a many-body energy spectrum, can be constructed in flat band systems. The key idea of our construction is to make use of orthogonal compact localized states. We concretely discuss our construction scheme, taking a saw-tooth flat lattice system as an example, and numerically demonstrate the presence of a quantum scar state. Examples of higher-dimensional systems are also addressed. Our construction method of quantum scar has broad applications to various flat band systems., 5+2 pages, 3+4 figures

Published

2020

48. Loss of ergodicity in a quantum hopping model of a dense many body system with repulsive interactions

Author

Kazue Matsuyama

Subjects

Statistics and Probability, Physics, Quantum phase transition, Statistical Mechanics (cond-mat.stat-mech), Strongly Correlated Electrons (cond-mat.str-el), Ergodicity, FOS: Physical sciences, Disordered Systems and Neural Networks (cond-mat.dis-nn), Condensed Matter - Disordered Systems and Neural Networks, Condensed Matter Physics, symbols.namesake, Quantization (physics), Condensed Matter - Strongly Correlated Electrons, Pauli exclusion principle, Quantum mechanics, Quantum system, symbols, Hamiltonian (quantum mechanics), Eigenstate thermalization hypothesis, Quantum, Condensed Matter - Statistical Mechanics

Abstract

In this work we report on a loss of ergodicity in a simple hopping model, motivated by the Hubbard Hamiltonian, of a many body quantum system at zero temperature, quantized in Euclidean time. We show that this quantum system may lose ergodicity at high densities on a large lattice, as a result of both Pauli exclusion and strong Coulomb repulsion. In particular we study particle hopping susceptibilities and the tendency towards particle localization. It is found that the appearance and existence of quantum phase transitions in this model, in the case of high density and strong Coulomb repulsion, depends on the starting configuration of particle trajectories in the numerical simulation. We argue that this breakdown may be the Euclidean time version of a breakdown of the eigenstate thermalization hypothesis in real time quantization., 36 pages, 50 figures. v2: Version to appear in Physica A

Published

2020

49. Topological Quantum Many-Body Scars in Quantum Dimer Models on the Kagome Lattice

Author

Julia Wildeboer, Anne E. B. Nielsen, N. S. Srivatsa, Onur Erten, and Alexander Seidel

Subjects

Physics, Superconductivity and magnetism, Strongly Correlated Electrons (cond-mat.str-el), Gaussian, FOS: Physical sciences, Quantum entanglement, Spectral line, Quantum dimer models, symbols.namesake, Condensed Matter - Strongly Correlated Electrons, Quantum mechanics, Lattice (order), symbols, Bipartite graph, Eigenstate thermalization hypothesis, Quantum

Abstract

We present a class of quantum dimer models on the kagome lattice with full translational invariance that feature a quantum many-body scar state of analytically known entanglement properties within their spectra. Using exact diagonalization on lattices of up to 60 sites, we show that non-scar states conform to the eigenstate thermalization hypothesis. Specifically, we show that energies are distributed according to the Gaussian ensemble expected of their respective symmetry sector, illustrate the existence of the scar from bipartite entanglement properties, and demonstrate revival phenomena in studies of fidelity dynamics., published version; analysis of fidelity dynamics added

Published

2020

50. Eigenstate thermalization hypothesis and eigenstate-to-eigenstate fluctuations

Author

Jae Dong Noh

Subjects

Physics, Fluctuation-dissipation theorem, Statistical Mechanics (cond-mat.stat-mech), Hilbert space, FOS: Physical sciences, Second moment of area, Observable, 01 natural sciences, Measure (mathematics), 010305 fluids & plasmas, symbols.namesake, Matrix (mathematics), Quantum mechanics, 0103 physical sciences, symbols, 010306 general physics, Eigenstate thermalization hypothesis, Eigenvalues and eigenvectors, Condensed Matter - Statistical Mechanics

Abstract

We investigate the extent to which the eigenstate thermalization hypothesis~(ETH) is valid or violated in the non-integrable and the integrable spin-$1/2$ XXZ chain. We perform the energy-resolved analysis of the statistical properties of matrix elements $\{O_{\gamma\alpha}\}$ of an observable $\hat{O}$ in the energy eigenstate basis. The Hilbert space is coarse-grained into energy shells of width $\Delta_E$, with which one can define a block submatrix $\tilde{O}^{(b,a)}$ consisting of elements between eigenstates in the $a$th and $b$th shells. Each block submatrix is characterized by constant values of $E_{\gamma\alpha}=(E_\gamma+E_\alpha)/2 \simeq \tilde{E}$ and $\omega_{\gamma\alpha}= (E_\gamma-E_\alpha) \simeq \omega$ up to $\Delta_E$. We will show that all matrix elements within a block are statistically equivalent to each other in the non-integrable case. Their distribution is characterized by $\bar{E}$ and $\omega$, and follows the prediction of the ETH. In stark contrast, eigenstate-to-eigenstate fluctuations persist in the integrable case. Consequently, matrix elements $O_{\gamma\alpha}$ cannot be characterized by the energy parameters $E_{\gamma\alpha}$ and $\omega_{\gamma\alpha}$ only. Our result explains the origin for the breakdown of the fluctuation dissipation theorem in the integrable system. The eigenstate-to-eigenstate fluctuations sheds a new light on the meaning of the ETH., Comment: revised version

Published

2020