Multitask Kernel-Learning Parameter Prediction Method for Solving Time-Dependent Linear Systems

IF 1.2 Q2 MATHEMATICS, APPLIED CSIAM Transactions on Applied Mathematics Pub Date : 2022-08-31 DOI:10.4208/csiam-am.so-2022-0049
Kai Jiang, Juan Zhang, Qishang Zhou
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Abstract

Matrix splitting iteration methods play a vital role in solving large sparse linear systems. Their performance heavily depends on the splitting parameters, however, the approach of selecting optimal splitting parameters has not been well developed. In this paper, we present a multitask kernel-learning parameter prediction method to automatically obtain relatively optimal splitting parameters, which contains simultaneous multiple parameters prediction and a data-driven kernel learning. For solving time-dependent linear systems, including linear differential systems and linear matrix systems, we give a new matrix splitting Kronecker product method, as well as its convergence analysis and preconditioning strategy. Numerical results illustrate our methods can save an enormous amount of time in selecting the relatively optimal splitting parameters compared with the exists methods. Moreover, our iteration method as a preconditioner can effectively accelerate GMRES. As the dimension of systems increases, all the advantages of our approaches becomes significantly. Especially, for solving the differential Sylvester matrix equation, the speedup ratio can reach tens to hundreds of times when the scale of the system is larger than one hundred thousand.
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求解时变线性系统的多任务核学习参数预测方法
矩阵分裂迭代法在求解大型稀疏线性系统中起着至关重要的作用。它们的性能在很大程度上取决于分裂参数,然而,选择最优分裂参数的方法尚未得到很好的发展。本文提出了一种多任务核学习参数预测方法,该方法包含多参数同时预测和数据驱动的核学习,可自动获得相对最优的分裂参数。对于求解时变线性系统,包括线性微分系统和线性矩阵系统,给出了一种新的矩阵分裂Kronecker积方法,以及它的收敛性分析和预处理策略。数值结果表明,与现有方法相比,该方法可以节省大量的时间来选择相对最优的分裂参数。此外,我们的迭代方法作为前置条件可以有效地加速GMRES。随着系统维度的增加,我们的方法的所有优点变得显著。特别是对于求解微分Sylvester矩阵方程,当系统规模大于十万时,加速比可达到数十倍至数百倍。
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