通过无换元准马格努斯算子对依赖时间的哈密顿量子模拟

IF 5.1 2区 物理与天体物理 Q1 PHYSICS, MULTIDISCIPLINARY
Quantum Pub Date : 2024-12-17 DOI:10.22331/q-2024-12-17-1567
Pablo Antonio Moreno Casares, Modjtaba Shokrian Zini, Juan Miguel Arrazola
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引用次数: 0

摘要

哈密顿模拟可以说是量子计算机最基本的应用。马格努斯算子是计算数学中一种常用的时变哈密顿模拟方法,但它的使用需要实现换元的指数,这使得它在量子计算中并不受欢迎。无换算器准马格努斯算子(CFQM)的开发规避了这一障碍,但其代价是缺乏可证明的全局数值误差边界。在这项工作中,我们通过仔细估算定义 CFQM 所涉及的每个步骤的误差,为基于 CFQM 的时变量子哈密顿模拟建立了这样一个误差边界。这样,我们就能将其成本与其他方法进行比较,并证明 CFQM 通常是最有效的乘积公式技术,其效率超过一个数量级。因此,我们发现 CFQM 对于在早期容错量子计算机上模拟与时间相关的哈密尔顿因子可能特别有用。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Quantum simulation of time-dependent Hamiltonians via commutator-free quasi-Magnus operators
Hamiltonian simulation is arguably the most fundamental application of quantum computers. The Magnus operator is a popular method for time-dependent Hamiltonian simulation in computational mathematics, yet its usage requires the implementation of exponentials of commutators, which has previously made it unappealing for quantum computing. The development of commutator-free quasi-Magnus operators (CFQMs) circumvents this obstacle, at the expense of a lack of provable global numeric error bounds. In this work, we establish one such error bound for CFQM-based time-dependent quantum Hamiltonian simulation by carefully estimating the error of each step involved in their definition. This allows us to compare its cost with the alternatives, and show that CFQMs are often the most efficient product-formula technique available by more than an order of magnitude. As a result, we find that CFQMs may be particularly useful to simulate time-dependent Hamiltonians on early fault-tolerant quantum computers.
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来源期刊
Quantum
Quantum Physics and Astronomy-Physics and Astronomy (miscellaneous)
CiteScore
9.20
自引率
10.90%
发文量
241
审稿时长
16 weeks
期刊介绍: Quantum is an open-access peer-reviewed journal for quantum science and related fields. Quantum is non-profit and community-run: an effort by researchers and for researchers to make science more open and publishing more transparent and efficient.
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