Sampling reduced density matrix to extract fine levels of entanglement spectrum and restore entanglement Hamiltonian
- URL: http://arxiv.org/abs/2310.16709v7
- Date: Wed, 26 Mar 2025 13:02:37 GMT
- Title: Sampling reduced density matrix to extract fine levels of entanglement spectrum and restore entanglement Hamiltonian
- Authors: Bin-Bin Mao, Yi-Ming Ding, Zhe Wang, Shijie Hu, Zheng Yan,
- Abstract summary: We propose a quantum Monte Carlo scheme with a low technical barrier, enabling precise extraction of the reduced density matrix (RDM)<n>We present the fine levels of the entanglement spectrum (ES), which is the logarithmic eigenvalues of the RDM.<n>Our simulation results, utilizing unprecedentedly large system sizes, establish a practical computational framework for determining entanglement quantities based on the RDM.
- Score: 5.39195907069028
- License: http://creativecommons.org/licenses/by-nc-sa/4.0/
- Abstract: The reduced density matrix (RDM) plays a key role in quantum entanglement and measurement, as it allows the extraction of almost all physical quantities related to the reduced degrees of freedom. However, restricted by the degrees of freedom in the environment, the total system size is often limited, let alone the subsystem. To address this challenge, we propose a quantum Monte Carlo scheme with a low technical barrier, enabling precise extraction of the RDM. To demonstrate the power of the method, we present the fine levels of the entanglement spectrum (ES), which is the logarithmic eigenvalues of the RDM. We clearly show the ES for a $1$D ladder with a long entangled boundary, and that for the $2$D Heisenberg model with a tower of states. Furthermore, we put forward an efficient way to restore the entanglement Hamiltonian in operator-form from the sampled RDM data. Our simulation results, utilizing unprecedentedly large system sizes, establish a practical computational framework for determining entanglement quantities based on the RDM, such as the ES, particularly in scenarios where the environment has a huge number of degrees of freedom.
Related papers
- Mitigating shot noise in local overlapping quantum tomography with semidefinite programming [0.0]
Reduced density matrices (RDMs) are fundamental in quantum information processing.
We propose a method to mitigate shot noise by re-enforcing certain constraints on RDMs.
We demonstrate the versatility and efficacy of our method by integrating it into an algorithmic cooling procedure.
arXiv Detail & Related papers (2025-01-30T18:17:13Z) - A Hierarchy of Spectral Gap Certificates for Frustration-Free Spin Systems [0.0]
We present a general method for obtaining lower bounds on the spectral gap of frustration-free quantum Hamiltonians in the thermodynamic limit.
We demonstrate the power of the method on one-dimensional spin-chain models where we observe an improvement by several orders of magnitude over existing finite size criteria.
arXiv Detail & Related papers (2024-11-06T06:04:03Z) - Optimal Quantum Overlapping Tomography [2.555222031881788]
Partial tomography has emerged as a promising approach for characterizing complex quantum systems.
We introduce a unified framework for optimal overlapping tomography by mapping the problem to clique cover model.
We experimentally validate the feasibility of our schemes on practical nuclear spin processor.
arXiv Detail & Related papers (2024-10-17T12:03:43Z) - Photo-induced dynamics with continuous and discrete quantum baths [0.0]
We introduce a pure-state unraveled hybrid-bath method that describes a continuous environment via a set of discrete, effective bosonic degrees of freedom.
Our method is capable of describing both, a continuous spectral density and sharp peaks embedded into it.
We demonstrate that compared to unitary descriptions, a significantly smaller number of bosonic modes suffices to describe the excitonic dynamics accurately.
arXiv Detail & Related papers (2024-06-11T08:20:50Z) - Enabling large-depth simulation of noisy quantum circuits with positive
tensor networks [0.0]
Matrix product density operators (MPDOs) are tensor network representations of locally purified density matrices.
MPDOs have interesting properties for mixed state representations: guaranteed positivity by construction, efficient conservation of the trace and computation of local observables.
We present a systematic way to reduce the bond dimensions of MPDOs by disentangling the purified state.
arXiv Detail & Related papers (2024-02-29T22:09:17Z) - 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) - Balancing error budget for fermionic k-RDM estimation [0.0]
This study aims to minimize various error constraints that causes challenges in higher-order RDMs estimation in quantum computing.
We identify the optimal balance between statistical and systematic errors in higher-order RDM estimation in particular when cumulant expansion is used to suppress the sample complexity.
arXiv Detail & Related papers (2023-12-29T03:31:39Z) - A Universal Framework for Quantum Dissipation:Minimally Extended State
Space and Exact Time-Local Dynamics [5.221249829454763]
dynamics of open quantum systems is formulated in a minimally extended state space.
Time-local evolution equation is created in a mixed Liouville-Fock space.
arXiv Detail & Related papers (2023-07-31T15:57:10Z) - Dissipative preparation and stabilization of many-body quantum states in
a superconducting qutrit array [55.41644538483948]
We present and analyze a protocol for driven-dissipatively preparing and stabilizing a manifold of quantum manybody entangled states.
We perform theoretical modeling of this platform via pulse-level simulations based on physical features of real devices.
Our work shows the capacity of driven-dissipative superconducting cQED systems to host robust and self-corrected quantum manybody states.
arXiv Detail & Related papers (2023-03-21T18:02:47Z) - Towards Neural Variational Monte Carlo That Scales Linearly with System
Size [67.09349921751341]
Quantum many-body problems are central to demystifying some exotic quantum phenomena, e.g., high-temperature superconductors.
The combination of neural networks (NN) for representing quantum states, and the Variational Monte Carlo (VMC) algorithm, has been shown to be a promising method for solving such problems.
We propose a NN architecture called Vector-Quantized Neural Quantum States (VQ-NQS) that utilizes vector-quantization techniques to leverage redundancies in the local-energy calculations of the VMC algorithm.
arXiv Detail & Related papers (2022-12-21T19:00:04Z) - Transition to chaos in extended systems and their quantum impurity
models [0.0]
Chaos sets a fundamental limit to quantum-information processing schemes.
We study the onset of chaos in spatially extended quantum many-body systems that are relevant to quantum optical devices.
arXiv Detail & Related papers (2022-05-02T18:01:09Z) - Noise-resilient Edge Modes on a Chain of Superconducting Qubits [103.93329374521808]
Inherent symmetry of a quantum system may protect its otherwise fragile states.
We implement the one-dimensional kicked Ising model which exhibits non-local Majorana edge modes (MEMs) with $mathbbZ$ parity symmetry.
MEMs are found to be resilient against certain symmetry-breaking noise owing to a prethermalization mechanism.
arXiv Detail & Related papers (2022-04-24T22:34:15Z) - Dynamic Dual Trainable Bounds for Ultra-low Precision Super-Resolution
Networks [82.18396309806577]
We propose a novel activation quantizer, referred to as Dynamic Dual Trainable Bounds (DDTB)
Our DDTB exhibits significant performance improvements in ultra-low precision.
For example, our DDTB achieves a 0.70dB PSNR increase on Urban100 benchmark when quantizing EDSR to 2-bit and scaling up output images to x4.
arXiv Detail & Related papers (2022-03-08T04:26:18Z) - Unlocking the general relationship between energy and entanglement
spectra via the wormhole effect [4.56850520666667]
We develop a scheme to overcome the exponential growth of computational complexity in reliably extracting low-lying entanglement spectrum from quantum Monte Carlo simulations.
We show that the wormhole effect amplifies the bulk energy gap by a factor of $beta$, the relative strength of that with respect to the edge energy gap will determine the behavior of low-lying entanglement spectrum of the system.
arXiv Detail & Related papers (2021-12-11T00:48:02Z) - Surrogate models for quantum spin systems based on reduced order
modeling [0.0]
We present a methodology to investigate phase-diagrams of quantum models based on the principle of the reduced basis method (RBM)
We benchmark the method in two test cases, a chain of excited Rydberg atoms and a geometrically frustrated antiferromagnetic two-dimensional lattice model.
arXiv Detail & Related papers (2021-10-29T10:17:39Z) - Visualizing spinon Fermi surfaces with time-dependent spectroscopy [62.997667081978825]
We propose applying time-dependent photo-emission spectroscopy, an established tool in solid state systems, in cold atom quantum simulators.
We show in exact diagonalization simulations of the one-dimensional $t-J$ model that the spinons start to populate previously unoccupied states in an effective band structure.
The dependence of the spectral function on the time after the pump pulse reveals collective interactions among spinons.
arXiv Detail & Related papers (2021-05-27T18:00:02Z) - Continuous-time dynamics and error scaling of noisy highly-entangling
quantum circuits [58.720142291102135]
We simulate a noisy quantum Fourier transform processor with up to 21 qubits.
We take into account microscopic dissipative processes rather than relying on digital error models.
We show that depending on the dissipative mechanisms at play, the choice of input state has a strong impact on the performance of the quantum algorithm.
arXiv Detail & Related papers (2021-02-08T14:55:44Z) - PAMS: Quantized Super-Resolution via Parameterized Max Scale [84.55675222525608]
Deep convolutional neural networks (DCNNs) have shown dominant performance in the task of super-resolution (SR)
We propose a new quantization scheme termed PArameterized Max Scale (PAMS), which applies the trainable truncated parameter to explore the upper bound of the quantization range adaptively.
Experiments demonstrate that the proposed PAMS scheme can well compress and accelerate the existing SR models such as EDSR and RDN.
arXiv Detail & Related papers (2020-11-09T06:16:05Z) - QuTiP-BoFiN: A bosonic and fermionic numerical
hierarchical-equations-of-motion library with applications in
light-harvesting, quantum control, and single-molecule electronics [51.15339237964982]
"hierarchical equations of motion" (HEOM) is a powerful exact numerical approach to solve the dynamics.
It has been extended and applied to problems in solid-state physics, optics, single-molecule electronics, and biological physics.
We present a numerical library in Python, integrated with the powerful QuTiP platform, which implements the HEOM for both bosonic and fermionic environments.
arXiv Detail & Related papers (2020-10-21T07:54:56Z) - The role of boundary conditions in quantum computations of scattering
observables [58.720142291102135]
Quantum computing may offer the opportunity to simulate strongly-interacting field theories, such as quantum chromodynamics, with physical time evolution.
As with present-day calculations, quantum computation strategies still require the restriction to a finite system size.
We quantify the volume effects for various $1+1$D Minkowski-signature quantities and show that these can be a significant source of systematic uncertainty.
arXiv Detail & Related papers (2020-07-01T17:43:11Z) - Probing chiral edge dynamics and bulk topology of a synthetic Hall
system [52.77024349608834]
Quantum Hall systems are characterized by the quantization of the Hall conductance -- a bulk property rooted in the topological structure of the underlying quantum states.
Here, we realize a quantum Hall system using ultracold dysprosium atoms, in a two-dimensional geometry formed by one spatial dimension.
We demonstrate that the large number of magnetic sublevels leads to distinct bulk and edge behaviors.
arXiv Detail & Related papers (2020-01-06T16:59:08Z)
This list is automatically generated from the titles and abstracts of the papers in this site.
This site does not guarantee the quality of this site (including all information) and is not responsible for any consequences.