多尺度偏微分方程量子算法

Junpeng Hu, Shi Jin, Lei Zhang
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摘要

多尺度建模与仿真》,第 22 卷第 3 期,第 1030-1067 页,2024 年 9 月。 摘要具有多个时间/空间尺度的偏微分方程(PDE)模型在物理学、工程学等多个学科中非常普遍。这些模型具有重要的实际意义,但由于网格过小、时间步长受限于缩放参数和 CFL 条件而难以求解。科学计算中的另一个挑战可能来自维数诅咒。在本文中,我们的目标是提供一种量子算法,该算法基于原始 PDEs 或其同质化模型的直接近似,适用于 PDEs(包括椭圆、抛物和双曲 PDEs)中的原型多尺度问题。为此,我们将把这些问题提升到更高维度,并利用最近开发的基于薛定谔化的量子模拟算法,有效降低由此产生的高维多尺度问题的计算成本。我们将研究离散化、均质化和松弛所产生的误差贡献,并分析和比较这些算法的复杂性,以确定不同方程在不同状态下的最佳算法。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Quantum Algorithms for Multiscale Partial Differential Equations
Multiscale Modeling &Simulation, Volume 22, Issue 3, Page 1030-1067, September 2024.
Abstract. Partial differential equation (PDE) models with multiple temporal/spatial scales are prevalent in several disciplines such as physics, engineering, and many others. These models are of great practical importance but notoriously difficult to solve due to prohibitively small mesh and time step sizes limited by the scaling parameter and CFL condition. Another challenge in scientific computing could come from curse-of-dimensionality. In this paper, we aim to provide a quantum algorithm, based on either direct approximations of the original PDEs or their homogenized models, for prototypical multiscale problems inPDEs, including elliptic, parabolic, and hyperbolic PDEs. To achieve this, we will lift these problems to higher dimensions and leverage the recently developed Schrödingerization based quantum simulation algorithms to efficiently reduce the computational cost of the resulting high-dimensional and multiscale problems. We will examine the error contributions arising from discretization, homogenization, and relaxation, and analyze and compare the complexities of these algorithms in order to identify the best algorithms in terms of complexities for different equations in different regimes.
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