Related papers: Non-equilibrium Quantum Monte Carlo Algorithm for Stabilizer Rényi Entropy in Spin Systems

Non-equilibrium Quantum Monte Carlo Algorithm for Stabilizer Rényi Entropy in Spin Systems

URL: http://arxiv.org/abs/2405.19577v2
Date: Sun, 1 Sep 2024 23:36:08 GMT
Title: Non-equilibrium Quantum Monte Carlo Algorithm for Stabilizer Rényi Entropy in Spin Systems
Authors: Zejun Liu, Bryan K. Clark,
Abstract summary: Quantum magic, or nonstabilizerness, provides a crucial characterization of quantum systems. We propose a novel and efficient algorithm for computing stabilizer R'enyi entropy, one of the measures for quantum magic, in spin systems with sign-problem free Hamiltonians.
Score: 0.552480439325792
License: http://creativecommons.org/licenses/by-nc-sa/4.0/
Abstract: Quantum magic, or nonstabilizerness, provides a crucial characterization of quantum systems, regarding the classical simulability with stabilizer states. In this work, we propose a novel and efficient algorithm for computing stabilizer R\'enyi entropy, one of the measures for quantum magic, in spin systems with sign-problem free Hamiltonians. This algorithm is based on the quantum Monte Carlo simulation of the path integral of the work between two partition function ensembles and it applies to all spatial dimensions and temperatures. We demonstrate this algorithm on the one and two dimensional transverse field Ising model at both finite and zero temperatures and show the quantitative agreements with tensor-network based algorithms. Furthermore, we analyze the computational cost and provide both analytical and numerical evidences for it to be polynomial in system size.

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