Dynamical quantum phase transitions and the Loschmidt echo: A transfer matrix approach

Andraschko, F.; Sirker, Jesko

doi:10.1103/physrevb.89.125120

Cited by 226 publications

(293 citation statements)

References 54 publications

(72 reference statements)

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“…One can begin to understand this in terms of the corresponding Fisher zeroes of the lattice partition function: if one does a quench originating from one phase and arriving in a different phase, one may expect (not always) a dynamical phase transition in the time evolution, which is governed by the Fisher zeroes [78]. With a reversed logic, when quenching inside the same phase, as in our case, a dynamical phase transition is not expected (although in some cases they were observed also without crossing a phase transition line, see [80,81]), thus neither are Fisher zeroes, i.e. branch points.…”

Section: Existence Uniqueness and Analytical Properties Of The Solutmentioning

confidence: 88%

“…This non-analytic behaviour was later shown to be robust under the inclusion of non-integrable interactions, irrelevant or relevant in the RG sense, using the tDMRG numerical method [79]. However more recently it was also shown that such nonanalyticities are caused more generally by a crossing of eigenvalues in the spectrum of the transfer matrix [80] and that they may not appear even if a critical line is crossed, thus indicating that the presence of zeros in Z(z) and non-analyticities in the free energy and L(t) are not a characteristic feature of dynamical phase transitions [81]. Further progress in the analytical calculation of the above quantity for integrable spin chains was made using Algebraic Bethe Ansatz techniques [82,83].…”

Section: Introductionmentioning

confidence: 99%

See 1 more Smart Citation

Quench echo and work statistics in integrable quantum field theories

Palmai

Sotiriadis

2014

Phys. Rev. E

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We propose a boundary thermodynamic Bethe ansatz calculation technique to obtain the Loschmidt echo and the statistics of the work done when a global quantum quench is performed on an integrable quantum field theory. We derive an analytic expression for the lowest edge of the probability density function and find that it exhibits universal features, in the sense that its scaling form depends only on the statistics of excitations. We perform numerical calculations on the sinh-Gordon model, a deformation of the free boson theory, and we obtain that by turning on the interaction the density function develops fermionic properties. The calculations are facilitated by a previously unnoticed property of the thermodynamic Bethe ansatz construction.

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Section: Existence Uniqueness and Analytical Properties Of The Solutmentioning

confidence: 88%

Section: Introductionmentioning

confidence: 99%

Quench echo and work statistics in integrable quantum field theories

Palmai

Sotiriadis

2014

Phys. Rev. E

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“…The initial observation by Heyl et al 4 that DPTs are associated with the sudden quenches across the QCP has been verified in several studies [7][8][9][10]16 . However, subsequently it has been shown that DPTs are not necessarily connected with the passage through the equilibrium QCP and may occur following a sudden quench even within the same phase (i.e., not crossing the QCP) for both integrable 11 as well as non-integrable models 12 .…”

Section: Introductionmentioning

confidence: 95%

Tuning the presence of dynamical phase transitions in a generalizedXYspin chain

Divakaran¹,

Sharma²,

Dutta³

2016

Phys. Rev. E

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We study an integrable spin chain with three spin interactions and the staggered field (λ) while the latter is quenched either slowly (in a linear fashion in time (t) as t/τ where t goes from a large negative value to a large positive value and τ is the inverse rate of quenching) or suddenly. In the process, the system crosses quantum critical points and gapless phases. We address the question whether there exist non-analyticities (known as dynamical phase transitions (DPTs)) in the subsequent real time evolution of the state (reached following the quench) governed by the final time-independent Hamiltonian. In the case of sufficiently slow quenching (when τ exceeds a critical value τ1), we show that DPTs, of the form similar to those occurring for quenching across an isolated critical point, can occur even when the system is slowly driven across more than one critical point and gapless phases. More interestingly, in the anisotropic situation we show that DPTs can completely disappear for some values of the anisotropy term (γ) and τ , thereby establishing the existence of boundaries in the (γ − τ ) plane between the DPT and no-DPT regions in both isotropic and anisotropic cases. Our study therefore leads to a unique situation when DPTs may not occur even when an integrable model is slowly ramped across a QCP. On the other hand, considering sudden quenches from an initial value λi to a final value λ f , we show that the condition for the presence of DPTs is governed by relations involving λi, λ f and γ and the spin chain must be swept across λ = 0 for DPTs to occur.

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“…The behavior of the Loschmidt echo after a quantum quench has been studied in a large body of recent literature, see, e.g., [18,22,25,34,. In particular, the Loschmidt echo is central to the study of so-called dynamical phase transitions [67][68][69][70][71][72][73][74][75][76]. By expanding |Ψ 0 in terms of the eigenstates |n of the final Hamiltonian H f , we find…”

Section: Str-el] 15 Sep 2015mentioning

confidence: 99%

“…In the current era of non-equilibrium physics, it has been widely used as a model system to explore and exemplify non-equilibrium phenomena, including studies of the Loschmidt echo (e.g. [22,46,[64][65][66][67][68]), studies of quenches of the anisotropy parameter ∆ (e.g. [99,100]), and of quenches starting from a Néel state (e.g.…”

Section: The Modelmentioning

confidence: 99%

Overlap distributions for quantum quenches in the anisotropic Heisenberg chain

et al. 2016

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The dynamics after a quantum quench is determined by the weights of the initial state in the eigenspectrum of the final Hamiltonian, i.e., by the distribution of overlaps in the energy spectrum. We present an analysis of such overlap distributions for quenches of the anisotropy parameter in the one-dimensional anisotropic spin-1/2 Heisenberg model (XXZ chain). We provide an overview of the form of the overlap distribution for quenches from various initial anisotropies to various final ones, using numerical exact diagonalization. We show that if the system is prepared in the antiferromagnetic Néel state (infinite anisotropy) and released into a non-interacting setup (zero anisotropy, XX point) only a small fraction of the final eigenstates gives contributions to the post-quench dynamics, and that these eigenstates have identical overlap magnitudes. We derive expressions for the overlaps, and present the selection rules that determine the final eigenstates having nonzero overlap. We use these results to derive concise expressions for time-dependent quantities (Loschmidt echo, longitudinal and transverse correlators) after the quench. We use perturbative analyses to understand the overlap distribution for quenches from infinite to small nonzero anisotropies, and for quenches from large to zero anisotropy.

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Dynamical quantum phase transitions and the Loschmidt echo: A transfer matrix approach

Cited by 226 publications

References 54 publications

Quench echo and work statistics in integrable quantum field theories

Quench echo and work statistics in integrable quantum field theories

Tuning the presence of dynamical phase transitions in a generalizedXYspin chain

Overlap distributions for quantum quenches in the anisotropic Heisenberg chain

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