Related papers: Unique and Universal scaling in dynamical quantum phase transitions

Unique and Universal scaling in dynamical quantum phase transitions

URL: http://arxiv.org/abs/2409.13293v3
Date: Wed, 25 Sep 2024 14:25:19 GMT
Title: Unique and Universal scaling in dynamical quantum phase transitions
Authors: Xiang Zhang, Liangdong Hu, Fuxiang Li,
Abstract summary: Universality and scaling are fundamental concepts in equilibrium continuous phase transitions. We unveil a unique and universal scaling behavior of the critical time in slowly driven dynamical quantum phase transition.
Score: 4.795322238686505
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: Universality and scaling are fundamental concepts in equilibrium continuous phase transitions. Here, we unveil a unique and universal scaling behavior of the critical time in slowly driven dynamical quantum phase transition. Going beyond the analogy with equilibrium phase transition, we find that the critical time exhibits a power-law scaling with quenching rate and the scaling exponent is fully determined by underlining universality class. We explain this unique scaling behavior based on the adiabatic-impulse scenario in the Kibble-Zurek mechanism. This universal scaling behavior is verified to be valid not only in noninteracting single-particle system, but also in many-body interacting system, and not only in Hermitian system, but also in non-Hermitian system. Our study unravels a deep and fundamental relationship between dynamical phase transition and equilibrium phase tranition.

Related papers

Measurement-induced transitions for interacting fermions [43.04146484262759]
We develop a field-theoretical framework that provides a unified approach to observables characterizing entanglement and charge fluctuations. Within this framework, we derive a replicated Keldysh non-linear sigma model (NLSM) By using the renormalization-group approach for the NLSM, we determine the phase diagram and the scaling of physical observables.
arXiv Detail & Related papers (2024-10-09T18:00:08Z)
Spectral chaos bounds from scaling theory of maximally efficient quantum-dynamical scrambling [49.1574468325115]
A key conjecture about the evolution of complex quantum systems towards an ergodic steady state, known as scrambling, is that this process acquires universal features when it is most efficient. We develop a single- parameter scaling theory for the spectral statistics in this scenario, which embodies exact self-similarity of the spectral correlations along the complete scrambling dynamics. We establish that scaling predictions are matched by a privileged process, and serve as bounds for other dynamical scrambling scenarios, allowing one to quantify inefficient or incomplete scrambling on all timescales.
arXiv Detail & Related papers (2023-10-17T15:41:50Z)
Non-equilibrium critical scaling and universality in a quantum simulator [0.0]
Universality and scaling laws are hallmarks of equilibrium phase transitions and critical phenomena. We show that the amplitude and timescale of the post-quench fluctuations scale with system size with distinct universal critical exponents. Our results demonstrate the ability of quantum simulators to explore universal scaling beyond the equilibrium paradigm.
arXiv Detail & Related papers (2023-09-19T18:04:25Z)
Continuous phase transition induced by non-Hermiticity in the quantum contact process model [44.58985907089892]
How the property of quantum many-body system especially the phase transition will be affected by the non-hermiticity remains unclear. We show that there is a continuous phase transition induced by the non-hermiticity in QCP. We observe that the order parameter and susceptibility display infinitely even for finite size system, since non-hermiticity endows universality many-body system with different singular behaviour from classical phase transition.
arXiv Detail & Related papers (2022-09-22T01:11:28Z)
Indication of critical scaling in time during the relaxation of an open quantum system [34.82692226532414]
Phase transitions correspond to the singular behavior of physical systems in response to continuous control parameters like temperature or external fields. Near continuous phase transitions, associated with the divergence of a correlation length, universal power-law scaling behavior with critical exponents independent of microscopic system details is found.
arXiv Detail & Related papers (2022-08-10T05:59:14Z)
Observation of Time-Crystalline Eigenstate Order on a Quantum Processor [80.17270167652622]
Quantum-body systems display rich phase structure in their low-temperature equilibrium states. We experimentally observe an eigenstate-ordered DTC on superconducting qubits. Results establish a scalable approach to study non-equilibrium phases of matter on current quantum processors.
arXiv Detail & Related papers (2021-07-28T18:00:03Z)
Exponentially accelerated approach to stationarity in Markovian open quantum systems through the Mpemba effect [0.0]
We show that the relaxation dynamics of Markovian open quantum systems can be accelerated exponentially by devising an optimal unitary transformation. This initial "rotation" is engineered in such a way that the state of the quantum system becomes to the slowest decaying dynamical mode. We illustrate our idea by showing how to achieve an exponential speed-up in the convergence to stationarity in Dicke models.
arXiv Detail & Related papers (2021-03-08T19:02:31Z)
Coherent and dissipative dynamics at quantum phase transitions [0.0]
Presentation is limited to issues related to, and controlled by, the quantum transition developed by closed many-body systems. We focus on the physical conditions giving rise to a nontrivial interplay between critical modes and various dissipative mechanisms.
arXiv Detail & Related papers (2021-03-03T19:00:58Z)
Exceptional Dynamical Quantum Phase Transitions in Periodically Driven Systems [0.0]
We show that spontaneous symmetry breaking can occur at a short-time regime. Our results open up research for hitherto unknown phases in short-time regimes.
arXiv Detail & Related papers (2020-12-22T04:04:56Z)
Determination of dynamical quantum phase transitions in strongly correlated many-body systems using Loschmidt cumulants [0.0]
We use Loschmidt cumulants to determine the critical times of interacting quantum systems after a quench. Our work demonstrates that Loschmidt cumulants are a powerful tool to unravel the far-from-equilibrium dynamics of strongly correlated many-body systems.
arXiv Detail & Related papers (2020-11-27T09:03:47Z)
Universality of entanglement transitions from stroboscopic to continuous measurements [68.8204255655161]
We show that the entanglement transition at finite coupling persists if the continuously measured system is randomly nonintegrable. This provides a bridge between a wide range of experimental settings and the wealth of knowledge accumulated for the latter systems.
arXiv Detail & Related papers (2020-05-04T21:45:59Z)

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