Related papers: Ground-state and thermal entanglements in a non-Hermitian XY system with real and imaginary magnetic fields

Ground-state and thermal entanglements in a non-Hermitian XY system with real and imaginary magnetic fields

URL: http://arxiv.org/abs/2203.05371v2
Date: Thu, 20 Apr 2023 08:49:11 GMT
Title: Ground-state and thermal entanglements in a non-Hermitian XY system with real and imaginary magnetic fields
Authors: Yue Li, Pan-Pan Zhang, Li-Zhen Hu, Yu-Liang Xu and Xiang-Mu Kong
Abstract summary: We study the non-Hermitian spin-1/2 XY model in the presence of alternating, imaginary and transverse magnetic fields. For the one-dimensional spin chain, the magnetization and entanglement are studied by using the two-spin cluster mean-field approximation.
Score: 4.274841694848563
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: In this manuscript, we study the non-Hermitian spin-1/2 XY model in the presence of the alternating, imaginary and transverse magnetic fields. For the two-site spin system, we solve exactly the energy spectrum and phase diagram, also calculate the ground-state and thermal entanglements by using the concept of the concurrence. It is found that the two-site concurrence in the eigenstate which only depends on the imaginary magnetic field {\eta} is always equal to one in the region of PT symmetry, while it decreases with {\eta} in the PT-symmetric broken region. Especially, the concurrence shows the non-analytic behavior at the exceptional point, and the same is true in the case of the biorthogonal basis, which indicates that the concurrence can characterize the phase transition in this non-Hermitian system. The interesting thing is that {\eta} weakens the thermal entanglement when the system is isotropic and enhances the entanglement when the system becomes the Ising model. For the one-dimensional spin chain, the magnetization and entanglement are further studied by using the two-spin cluster mean-field approximation. The results show that their variations have opposite trends with the magnetic fields. Moreover, the system exists the first-order quantum phase transitions for some anisotropic parameters in the PT-symmetry region, and the entanglement changes suddenly at the quantum phase transition point.

Related papers

Entanglement phase transition due to reciprocity breaking without measurement or post-selection [59.63862802533879]
EPT occurs for a system undergoing purely unitary evolution. We analytically derive the entanglement entropy out of and at the critical point for the $l=1$ and $l/N ll 1$ case.
arXiv Detail & Related papers (2023-08-28T14:28:59Z)
Recognizing critical lines via entanglement in non-Hermitian systems [0.0]
We show that the non-Hermitian model can be an effective Hamiltonian of a Hermitian XX spin-1/2 with KSEA interaction and a local magnetic field. We demonstrate that the nearest-neighbor entanglement and its derivative can identify quantum critical lines with the variation of the magnetic field.
arXiv Detail & Related papers (2023-05-15T06:20:56Z)
Geometric phases along quantum trajectories [58.720142291102135]
We study the distribution function of geometric phases in monitored quantum systems. For the single trajectory exhibiting no quantum jumps, a topological transition in the phase acquired after a cycle. For the same parameters, the density matrix does not show any interference.
arXiv Detail & Related papers (2023-01-10T22:05:18Z)
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)
Achieving spin-squeezed states by quench dynamics in a quantum chain [0.0]
We study the time evolution of spin squeezing in the one-dimensional spin-1/2 XY model subject to a sudden quantum quench of a transverse magnetic field. Our analysis, based on exact results for the model, reveals that by a proper choice of protocol, a quantum quench from an unsqueezed state can create spin squeezed nonequilibrium states.
arXiv Detail & Related papers (2021-08-31T12:48:52Z)
Localization transition induced by programmable disorder [0.24629531282150877]
Many-body localization occurs on a spin-1/2 transverse-field Ising model. We observe a transition from an ergodic phase to a non-thermal phase for individual energy eigenstates. We realize the time-independent disordered Ising Hamiltonian experimentally on a D-Wave 2000Q programmable quantum annealer.
arXiv Detail & Related papers (2021-08-15T15:37:32Z)
Phase diagram of a distorted kagome antiferromagnet and application to Y-kapellasite [50.591267188664666]
We reveal a rich ground state phase diagram even at the classical level. The presented model opens a new direction in the study of kagome antiferromagnets.
arXiv Detail & Related papers (2021-07-28T18:00:03Z)
Uhlmann phase in composite systems with entanglement [0.0]
We study the geometric Uhlmann phase of entangled mixed states in a composite system made of two coupled spin-$frac 1 2$ particles with a magnetic field acting on one of them. We find an explicit connection to the concurrence of the depolarizing channel density matrix, which allows to characterize the features of the Uhlmann phase.
arXiv Detail & Related papers (2021-06-30T08:14:11Z)
Constant of motion identifying excited-state quantum phases [0.0]
A broad class of excited-state quantum phase transitions (ESQPTs) gives rise to two different excited-state quantum phases. These phases are identified by means of an operator, $hatmathcalC$, which is a constant of motion only in one of them. We present stringent numerical evidence in the Rabi and Dicke models, suggesting that this result is exact in the thermodynamic limit.
arXiv Detail & Related papers (2021-03-19T12:17:36Z)
Superradiant phase transition in complex networks [62.997667081978825]
We consider a superradiant phase transition problem for the Dicke-Ising model. We examine regular, random, and scale-free network structures.
arXiv Detail & Related papers (2020-12-05T17:40:53Z)
New approach to describe two coupled spins in a variable magnetic field [55.41644538483948]
We describe the evolution of two spins coupled by hyperfine interaction in an external time-dependent magnetic field. We modify the time-dependent Schr"odinger equation through a change of representation. The solution is highly simplified when an adiabatically varying magnetic field perturbs the system.
arXiv Detail & Related papers (2020-11-23T17:29:31Z)

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