基于IBM QISKit平台的量子线性系统算法求解高阶数学问题的数值方法

Simran Jakhodia, Babita Jajodia
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摘要

研究人员目前正在研究基于量子系统的计算解决方案,以加快复杂数学模型的速度。这项工作介绍了如何将复杂的计算问题表述为线性方程组的量子系统,并使用量子线性系统算法(QLSA)找到解决方案,也称为量子哈罗-哈西德姆-劳埃德(HHL)算法。本文展示了在IBM量子计算信息软件套件(QISKit)平台上将多个问题语句(曲线拟合函数、插值多项式)作为线性方程组的量子系统进行实验评估,这些方程组涉及将Vandermonde矩阵作为协效矩阵进行计算。同时给出了一些例子来证明它在对角矩阵、厄米矩阵和非厄米矩阵上作为协效率矩阵的计算。保真度被用作性能度量,用于比较量子结果与IBM QISKit上现有经典解决方案的准确性,并从实验结果中得出结论。实验评估表明,保真度取决于输入矩阵的稀疏性,因此结果会随输入矩阵的不同而变化。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Numerical Methods for Solving High-Order Mathematical Problems using Quantum Linear System Algorithm on IBM QISKit Platform
Researchers are currently working on computational solutions based on quantum systems to accelerate the speed of complex mathematical models. This work presented how to formulate complex computational problems as a quantum system of linear equations and find solutions using Quantum Linear System Algorithm (QLSA), also called Quantum Harrow-Hassidim-Lloyd (HHL) algorithm. This paper showed experimental evaluation of multiple problem statements (curve-fitting functions, interpolating polynomials) as a quantum system of linear equations that involve computation of Vandermonde matrices as co-efficient matrices on IBM Quantum Information Software Kit for Quantum Computation (QISKit) platform. Along with a few examples demonstrating its evaluation on diagonal, Hermitian, and Non-Hermitian matrices as co-efficient matrices. The fidelity is used as a measure of performance for comparing the accuracy of quantum results with respect to existing classical solutions on IBM QISKit and drawing conclusions from the experimental results. Experimental evaluation shows that the fidelity depends on the sparsity of the input matrices and therefore the results vary depending on those matrices.
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