Related papers: Thermal-Drift Sampling: Generating Random Thermal Ensembles for Quantum Chaos Diagnostics

Thermal-Drift Sampling: Generating Random Thermal Ensembles for Quantum Chaos Diagnostics

URL: http://arxiv.org/abs/2602.05912v1
Date: Thu, 05 Feb 2026 17:27:40 GMT
Title: Thermal-Drift Sampling: Generating Random Thermal Ensembles for Quantum Chaos Diagnostics
Authors: Jiyu Jiang, Mingrui Jing, Jizhe Lai, Xin Wang, Lei Zhang,
Abstract summary: Random thermal states of many-body Hamiltonians underpin studies of thermalization, chaos, and quantum phase transitions.<n>We introduce the thermal-drift channel, a measurement-based operation that implements a tunable nonunitary drift along a chosen Pauli term.<n>We present a measurement-controlled sampling algorithm that generates thermal states together with their Hamiltonian "labels" for general physical models.
Score: 7.678849469440775
License: http://creativecommons.org/licenses/by/4.0/
Abstract: Random thermal states of many-body Hamiltonians underpin studies of thermalization, chaos, and quantum phase transitions, yet their generation remains costly when each Hamiltonian must be prepared individually. We introduce the thermal-drift channel, a measurement-based operation that implements a tunable nonunitary drift along a chosen Pauli term. Based on this channel, we present a measurement-controlled sampling algorithm that generates thermal states together with their Hamiltonian "labels" for general physical models. We prove that the total gate count of our algorithm scales cubically with system size, quadratically with inverse temperature, and as the inverse error tolerance to the two-thirds power, with logarithmic dependence on the allowed failure probability. We also show that the induced label distribution approaches a normal distribution reweighted by the thermal partition function, which makes an explicit trade-off between accuracy and effective range. Numerical simulations for a 2D Heisenberg model validate the predicted scaling and distribution. As an application, we compute unfolding-free level-spacing ratio statistics from sampled thermal states of a 2D transverse-field Ising model and observe a crossover toward the Wigner--Dyson prediction, demonstrating a practical and scalable route to chaos diagnostics and random matrix universality studies on near-term quantum hardware.

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