Related papers: Exact bounds for dynamical critical exponents of transverse-field Ising chains with a correlated disorder

Exact bounds for dynamical critical exponents of transverse-field Ising chains with a correlated disorder

URL: http://arxiv.org/abs/2007.07439v4
Date: Tue, 6 Apr 2021 04:25:31 GMT
Title: Exact bounds for dynamical critical exponents of transverse-field Ising chains with a correlated disorder
Authors: Tatsuhiko Shirai and Shu Tanaka
Abstract summary: We show that in the presence of a correlated disorder, the dynamical critical exponent is finite. We also show that the dynamical critical exponent depends on the tuning process of the transverse field strengths.
Score: 0.951828574518325
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: This study investigates the dynamical critical exponent of disordered Ising chains under transverse fields to examine the effect of a correlated disorder on quantum phase transitions. The correlated disorder, where the on-site transverse field depends on the nearest-neighbor coupling strengths connecting the site, gives a qualitatively different result from the uncorrelated disorder. In the uncorrelated disorder cases where the transverse field is either homogeneous over sites or random independently of the nearest-neighbor coupling strengths, the dynamical critical exponent is infinite. In contrast, in the presence of the correlated disorder, we analytically show that the dynamical critical exponent is finite. We also show that the dynamical critical exponent depends on the tuning process of the transverse field strengths.

Related papers

Critical spin models from holographic disorder [49.1574468325115]
We study the behavior of XXZ spin chains with a quasiperiodic disorder not present in continuum holography. Our results suggest the existence of a class of critical phases whose symmetries are derived from models of discrete holography.
arXiv Detail & Related papers (2024-09-25T18:00:02Z)
Probing Causation Dynamics in Quantum Chains near Criticality [0.0]
We use a recent quantum extension of Liang information to investigate causation in quantum chains across their phase diagram. We discern a notable shift in causation behavior across the critical point with each case exhibiting distinct hallmarks, different from correlation measures.
arXiv Detail & Related papers (2024-03-28T12:25:29Z)
Softening of Majorana edge states by long-range couplings [77.34726150561087]
Long-range couplings in the Kitaev chain is shown to modify the universal scaling of topological states close to the critical point. We prove that the Majorana states become increasingly delocalised at a universal rate which is only determined by the interaction range.
arXiv Detail & Related papers (2023-01-29T19:00:08Z)
Anomalous criticality with bounded fluctuations and long-range frustration induced by broken time-reversal symmetry [0.0]
We consider a one-dimensional Dicke lattice with complex photon hopping amplitudes. We investigate the influence of time-reversal symmetry breaking due to synthetic magnetic fields.
arXiv Detail & Related papers (2022-08-03T18:00:04Z)
Rogue waves in quantum lattices with correlated disorder [0.0]
We investigate the outbreak of anomalous quantum wavefunction amplitudes in a one-dimensional tight-binding lattice featuring correlated diagonal disorder. The effective correlation length of the disorder is ultimately responsible for bringing the local disorder strength to a minimum.
arXiv Detail & Related papers (2022-07-31T23:07:37Z)
Exact bounds on the energy gap of transverse-field Ising chains by mapping to random walks [0.0]
Based on a relationship with continuous-time random walks discovered by Igl'oi, Turban, and Rieger, we derive exact lower and upper bounds on the lowest energy gap of open transverse-field Ising chains. Applying the bounds to random transverse-field Ising chains with coupling-field correlations, a model which is relevant for adiabatic quantum computing, the finite-size scaling of the gap is shown to be related to that of sums of independent random variables.
arXiv Detail & Related papers (2022-06-23T09:42:46Z)
Decimation technique for open quantum systems: a case study with driven-dissipative bosonic chains [62.997667081978825]
Unavoidable coupling of quantum systems to external degrees of freedom leads to dissipative (non-unitary) dynamics. We introduce a method to deal with these systems based on the calculation of (dissipative) lattice Green's function. We illustrate the power of this method with several examples of driven-dissipative bosonic chains of increasing complexity.
arXiv Detail & Related papers (2022-02-15T19:00:09Z)
Hidden Quantum Criticality and Entanglement in Quench Dynamics [0.0]
Entanglement exhibits universal behavior near the ground-state critical point where correlations are long-ranged and the thermodynamic entropy is vanishing. A quantum quench imparts extensive energy and results in a build-up of entropy, hence no critical behavior is expected at long times. We show that quantum criticality is hidden in higher-order correlations and becomes manifest via measures such as the mutual information and logarithmic negativity.
arXiv Detail & Related papers (2022-02-09T19:00:00Z)
Spectrum of localized states in fermionic chains with defect and adiabatic charge pumping [68.8204255655161]
We study the localized states of a generic quadratic fermionic chain with finite-range couplings. We analyze the robustness of the connection between bands against perturbations of the Hamiltonian.
arXiv Detail & Related papers (2021-07-20T18:44:06Z)
Deconfounded Score Method: Scoring DAGs with Dense Unobserved Confounding [101.35070661471124]
We show that unobserved confounding leaves a characteristic footprint in the observed data distribution that allows for disentangling spurious and causal effects. We propose an adjusted score-based causal discovery algorithm that may be implemented with general-purpose solvers and scales to high-dimensional problems.
arXiv Detail & Related papers (2021-03-28T11:07:59Z)
Localisation in quasiperiodic chains: a theory based on convergence of local propagators [68.8204255655161]
We present a theory of localisation in quasiperiodic chains with nearest-neighbour hoppings, based on the convergence of local propagators. Analysing the convergence of these continued fractions, localisation or its absence can be determined, yielding in turn the critical points and mobility edges. Results are exemplified by analysing the theory for three quasiperiodic models covering a range of behaviour.
arXiv Detail & Related papers (2021-02-18T16:19:52Z)

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