Quantum optimization algorithm based on multistep quantum computation

IF 2.8 2区 物理与天体物理 Q2 PHYSICS, MULTIDISCIPLINARY
Hefeng Wang and Hua Xiang
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引用次数: 0

Abstract

We present a quantum algorithm for finding the minimum of a function based on multistep quantum computation, and apply the algorithm for solving optimization problems with continuous variables. We construct the state space of the problem by discretizing the variables of the problem, and divide the state space according to the function values of the vectors of the state space. By comparing the function values of the vectors with a series of threshold values in decreasing order, we construct a sequence of Hamiltonians where the search space of a Hamiltonian is nested in that of the previous one. By applying a multistep quantum computation process for finding the ground state of the last Hamiltonian, the optimal vector of the state space of the problem is located in a small search space and can be determined efficiently. One of the most difficult problems in optimization algorithms is that a trial vector is trapped in a deep local minimum while the global minimum is missed, this problem can be alleviated in our algorithm and the run time is proportional to the number of the steps of the algorithm, provided that the reduction rate of the search spaces is polynomial large. We discuss the implementation of the algorithm and test the algorithm for some test functions.
基于多步量子计算的量子优化算法
我们提出了一种基于多步量子计算的求函数最小值的量子算法,并将该算法应用于解决连续变量的优化问题。我们通过将问题的变量离散化来构建问题的状态空间,并根据状态空间向量的函数值来划分状态空间。通过将矢量的函数值与一系列按递减顺序排列的阈值进行比较,我们构建了一个哈密顿序列,其中一个哈密顿的搜索空间嵌套在前一个哈密顿的搜索空间中。通过应用多步量子计算过程寻找最后一个哈密顿的基态,问题状态空间的最优向量就会被定位在一个很小的搜索空间内,并能高效地确定。优化算法中最难解决的问题之一是试验向量陷入深度局部最小值而错过全局最小值,我们的算法可以缓解这一问题,只要搜索空间的缩小率是多项式大,运行时间就与算法的步数成正比。我们讨论了算法的实现,并对一些测试函数进行了测试。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
New Journal of Physics
New Journal of Physics 物理-物理:综合
CiteScore
6.20
自引率
3.00%
发文量
504
审稿时长
3.1 months
期刊介绍: New Journal of Physics publishes across the whole of physics, encompassing pure, applied, theoretical and experimental research, as well as interdisciplinary topics where physics forms the central theme. All content is permanently free to read and the journal is funded by an article publication charge.
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