Related papers: Extracting Universal Corner Entanglement Entropy during the Quantum Monte Carlo Simulation

Extracting Universal Corner Entanglement Entropy during the Quantum Monte Carlo Simulation

URL: http://arxiv.org/abs/2404.13876v4
Date: Fri, 28 Mar 2025 04:48:02 GMT
Title: Extracting Universal Corner Entanglement Entropy during the Quantum Monte Carlo Simulation
Authors: Yuan Da Liao, Menghan Song, Jiarui Zhao, Zi Yang Meng,
Abstract summary: Subleading corner logarithmic corrections in entanglement entropy (EE) are crucial for revealing universal characteristics of quantum critical points (QCPs)<n>We have developed a new method for directly measuring the corner contribution in EE with less computational cost.
Score: 0.3749861135832073
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: The subleading corner logarithmic corrections in entanglement entropy (EE) are crucial for revealing universal characteristics of the quantum critical points (QCPs), but they are challenging to detect. Motivated by recent developments in the stable computation of EE in (2+1)D quantum many-body systems, we have developed a new method for directly measuring the corner contribution in EE with less computational cost. The cornerstone of our approach is to measure the subtracted corner entanglement entropy (SCEE) defined as the difference between the EEs of subregions with the same boundary length for smooth and cornered boundaries during the sign-problem free quantum Monte Carlo simulation. Our improved method inherently eliminates not only the area law term of EE but also the subleading log-corrections arising from Goldstone modes, leaving the universal corner contribution as the leading term of SCEE with greatly improved data quality. Utilizing this advanced approach, we calculate the SCEE of the bilayer Heisenberg model on both square and honeycomb lattices across their (2+1)D O(3) QCPs with different opening angles on entanglement boundary, and obtain the accurate values of the corresponding universal corner log-coefficients. These findings will encourage further theoretical investigations to access controlled universal information for interacting CFTs at (2+1)D.

Related papers

Precise computation of universal corner entanglement entropy at 2+1 dimension: From Ising to Gaussian quantum critical points [0.6977547772245161]
entanglement entropy (EE) of (2+1)d quantum many-body systems remains a significant challenge.<n>We develop a it bubble basis projector quantum Monte Carlo (QMC) algorithm to precisely and efficiently compute the universal corner EE.<n>Results establish the long-sought connection between the universal values of an exactly solvable limit and those of a strongly correlated regime at (2+1)d.
arXiv Detail & Related papers (2025-11-29T08:16:13Z)
Mind Your Entropy: From Maximum Entropy to Trajectory Entropy-Constrained RL [56.085103402298905]
We propose a trajectory entropy-constrained reinforcement learning (TECRL) framework to address these two challenges.<n>Within this framework, we first separately learn two Q-functions, one associated with reward and the other with entropy, ensuring clean and stable value targets unaffected by temperature updates.<n>We develop a practical off-policy algorithm, DSAC-E, by extending the state-of-the-art distributional soft actor-critic with three refinements.
arXiv Detail & Related papers (2025-10-25T09:17:47Z)
Universal shape-dependence of quantum entanglement in disordered magnets [0.0]
We present a systematic analysis of quantum entanglement in the paradigmatic random transverse-field Ising model in two dimensions.<n>We quantify how the corner contribution depends on the shape of the subsystem.
arXiv Detail & Related papers (2025-07-06T22:19:05Z)
Corner Charge Fluctuation as an Observable for Quantum Geometry and Entanglement in Two-dimensional Insulators [0.5120567378386615]
We show that for generic lattice systems of interacting particles, the corner charge fluctuation is directly related to quantum geometry. A model of a compact obstructed atomic insulator is introduced to illustrate this effect analytically. numerical verification for various Chern insulator models further demonstrate the experimental relevance of the corner charge fluctuation in a finite-size quantum simulator.
arXiv Detail & Related papers (2024-06-24T18:00:03Z)
KPZ scaling from the Krylov space [83.88591755871734]
Recently, a superdiffusion exhibiting the Kardar-Parisi-Zhang scaling in late-time correlators and autocorrelators has been reported. Inspired by these results, we explore the KPZ scaling in correlation functions using their realization in the Krylov operator basis.
arXiv Detail & Related papers (2024-06-04T20:57:59Z)
Quantum entanglement in the multicritical disordered Ising model [0.0]
entanglement entropy is calculated at the quantum multicritical point of the random transverse-field Ising model. We find a universal logarithmic corner contribution to the area law b*ln(l) that is independent of the form of disorder.
arXiv Detail & Related papers (2024-04-19T16:42:43Z)
Gaussian Entanglement Measure: Applications to Multipartite Entanglement of Graph States and Bosonic Field Theory [50.24983453990065]
An entanglement measure based on the Fubini-Study metric has been recently introduced by Cocchiarella and co-workers. We present the Gaussian Entanglement Measure (GEM), a generalization of geometric entanglement measure for multimode Gaussian states. By providing a computable multipartite entanglement measure for systems with a large number of degrees of freedom, we show that our definition can be used to obtain insights into a free bosonic field theory.
arXiv Detail & Related papers (2024-01-31T15:50:50Z)
GRAPE optimization for open quantum systems with time-dependent decoherence rates driven by coherent and incoherent controls [77.34726150561087]
The GRadient Ascent Pulse Engineering (GRAPE) method is widely used for optimization in quantum control. We adopt GRAPE method for optimizing objective functionals for open quantum systems driven by both coherent and incoherent controls. The efficiency of the algorithm is demonstrated through numerical simulations for the state-to-state transition problem.
arXiv Detail & Related papers (2023-07-17T13:37:18Z)
Many-Body Excited States with a Contracted Quantum Eigensolver [0.0]
We develop an excited state approach based on the contracted quantum eigensolver (ES-CQE) We show the ES-CQE near-exact accuracy across the majority of states, covering regions of strong and weak electron correlation.
arXiv Detail & Related papers (2023-05-16T17:53:07Z)
Quantum Gate Generation in Two-Level Open Quantum Systems by Coherent and Incoherent Photons Found with Gradient Search [77.34726150561087]
We consider an environment formed by incoherent photons as a resource for controlling open quantum systems via an incoherent control. We exploit a coherent control in the Hamiltonian and an incoherent control in the dissipator which induces the time-dependent decoherence rates.
arXiv Detail & Related papers (2023-02-28T07:36:02Z)
Three-fold way of entanglement dynamics in monitored quantum circuits [68.8204255655161]
We investigate the measurement-induced entanglement transition in quantum circuits built upon Dyson's three circular ensembles. We obtain insights into the interplay between the local entanglement generation by the gates and the entanglement reduction by the measurements.
arXiv Detail & Related papers (2022-01-28T17:21:15Z)
The refined quantum extremal surface prescription from the asymptotic equipartition property [0.0]
One-shot information-theoretic entropies are more fundamental entropy measures from the quantum information perspective. We combine the technical methods from both quantum information and quantum gravity to put this idea on firm grounds. We derive the refined quantum extremal surface prescription for fixed-area states via a novel AEP replica trick.
arXiv Detail & Related papers (2021-05-12T18:26:30Z)
Geometric entanglement in integer quantum Hall states [0.0]
We study the quantum entanglement structure of integer quantum Hall states via the reduced density matrix of spatial subregions. We focus on an important class of regions that contain sharp corners or cusps, leading to a geometric angle-dependent contribution to the EE.
arXiv Detail & Related papers (2020-09-04T18:00:19Z)
Quantum-optimal-control-inspired ansatz for variational quantum algorithms [105.54048699217668]
A central component of variational quantum algorithms (VQA) is the state-preparation circuit, also known as ansatz or variational form. Here, we show that this approach is not always advantageous by introducing ans"atze that incorporate symmetry-breaking unitaries. This work constitutes a first step towards the development of a more general class of symmetry-breaking ans"atze with applications to physics and chemistry problems.
arXiv Detail & Related papers (2020-08-03T18:00:05Z)

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