Related papers: Approaching the scaling limit of transport through lattices with dephasing

Approaching the scaling limit of transport through lattices with dephasing

URL: http://arxiv.org/abs/2510.04062v1
Date: Sun, 05 Oct 2025 06:51:40 GMT
Title: Approaching the scaling limit of transport through lattices with dephasing
Authors: Subhajit Sarkar, Gabriela Wójtowicz, Bartłomiej Gardas, Marek M. Rams, Michael Zwolak,
Abstract summary: We study the stationary--state equations for lattices with generalized Markovian dephasing and relaxation.<n>We present an efficient solution that helps to achieve the scaling limit.<n>There is a wide range of problems that have Markovian relaxation, noise, and driving.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: We examine the stationary--state equations for lattices with generalized Markovian dephasing and relaxation. When the Hamiltonian is quadratic, the single--particle correlation matrix has a closed system of equations even in the presence of these two processes. The resulting equations have a vectorized form related to, but distinct from, Lyapunov's equation. We present an efficient solution that helps to achieve the scaling limit, e.g., of the current decay with lattice length. As an example, we study the super--diffusive--to--diffusive transition in a lattice with long--range hopping and dephasing. The approach enables calculations with up to $10^4$ sites, representing an increase of $10$ to $40$ times over prior studies. This enables a more precise extraction of the diffusion exponent, enhances agreement with theoretical results, and supports the presence of a phase transition. There is a wide range of problems that have Markovian relaxation, noise, and driving. They include quantum networks for machine--learning--based classification and extended reservoir approaches (ERAs) for transport. The results here will be useful for these classes of problems.

Related papers

Transmutation based Quantum Simulation for Non-unitary Dynamics [35.35971148847751]
We present a quantum algorithm for simulating dissipative diffusion dynamics generated by positive semidefinite operators of the form $A=Ldagger L$.<n>Our main tool is the Kannai transform, which represents the diffusion semigroup $e-TA$ as a Gaussian-weighted superposition of unitary wave propagators.
arXiv Detail & Related papers (2026-01-07T05:47:22Z)
Transfer matrix approach to quantum systems subject to certain Lindblad evolution [0.0]
We find a simple expression of the Green's function in the Laplace domain.<n>It can be used to get analytical results in the thermodynamic limit.<n>It also provides a fast numerical method to determine the evolution of the density.
arXiv Detail & Related papers (2025-01-23T11:06:00Z)
Closed-form solutions for the Salpeter equation [41.94295877935867]
We study the propagator of the $1+1$ dimensional Salpeter Hamiltonian, describing a relativistic quantum particle with no spin. The analytical extension of the Hamiltonian in the complex plane allows us to formulate the equivalent problem, namely the B"aumer equation. This B"aumera corresponds to the Green function of a relativistic diffusion process that interpolates between Cauchy for small times and Gaussian diffusion for large times.
arXiv Detail & Related papers (2024-06-26T15:52:39Z)
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)
Ito Diffusion Approximation of Universal Ito Chains for Sampling, Optimization and Boosting [64.0722630873758]
We consider rather general and broad class of Markov chains, Ito chains, that look like Euler-Maryama discretization of some Differential Equation. We prove the bound in $W_2$-distance between the laws of our Ito chain and differential equation.
arXiv Detail & Related papers (2023-10-09T18:38:56Z)
Free fermions with dephasing and boundary driving: Bethe Ansatz results [0.0]
We use the Bethe ansatz to diagonalize the Liouvillian $mathcal Lscriptscriptstyle(2)$ governing the dynamics of the correlator.<n> Precisely, $L(L-1)/2$ complex energies do not depend on dephasing, apart for a trivial shift.<n>The long-time dynamics is governed by a band of real energies, which contains an extensive number of levels.
arXiv Detail & Related papers (2023-09-22T16:18:41Z)
Theory of free fermions under random projective measurements [43.04146484262759]
We develop an analytical approach to the study of one-dimensional free fermions subject to random projective measurements of local site occupation numbers. We derive a non-linear sigma model (NLSM) as an effective field theory of the problem.
arXiv Detail & Related papers (2023-04-06T15:19:33Z)
Survey of the Hierarchical Equations of Motion in Tensor-Train format for non-Markovian quantum dynamics [0.0]
This work is a survey about the hierarchical equations of motion and their implementation with the tensor-train format. We recall the link with the perturbative second order time convolution equations also known as the Bloch-Redfield equations. The main points of the tensor-train expansion are illustrated in an example with a qubit interacting with a bath described by a Lorentzian spectral density.
arXiv Detail & Related papers (2023-03-08T14:21:43Z)
Stochastic Optimal Control for Collective Variable Free Sampling of Molecular Transition Paths [60.254555533113674]
We consider the problem of sampling transition paths between two given metastable states of a molecular system. We propose a machine learning method for sampling said transitions.
arXiv Detail & Related papers (2022-06-27T14:01:06Z)
An Accurate Pentadiagonal Matrix Solution for the Time-Dependent Schr\"{o}dinger Equation [2.480301925841752]
We invoke the highly accurate five-point stencil to discretize the wave function onto an Implicit-Explicit pentadiagonal Crank-Nicolson scheme. It is demonstrated that the resultant solutions are significantly more accurate than the standard ones.
arXiv Detail & Related papers (2022-05-26T16:16:56Z)
Solving the time-independent Schr\"odinger equation for chains of coupled excitons and phonons using tensor trains [0.0]
We demonstrate how to apply the tensor-train format to solve the time-independent Schr"odinger equation. We also investigate uncoupled problems for which (semi-)analytical results exist.
arXiv Detail & Related papers (2021-09-30T13:08:19Z)
Lifting the Convex Conjugate in Lagrangian Relaxations: A Tractable Approach for Continuous Markov Random Fields [53.31927549039624]
We show that a piecewise discretization preserves better contrast from existing discretization problems. We apply this theory to the problem of matching two images.
arXiv Detail & Related papers (2021-07-13T12:31:06Z)

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