报告题目:Data-Driven Optimal Iterative Parameter Prediction and its Applications
报告时间:2024-05-06 15:00-16:00
报 告 人:张娟 教授 (湘潭大学)
报告地点:武汉大学理学院东北楼四楼报告厅
Abstract:Matrix splitting iterative methods with
parameters play a crucial role in solving linear systems. How to choose optimal
splitting parameters is a key problem. In this talk, we propose a data-driven
approach for predicting optimal iterative parameters: multi-task kernel
learning Gaussian regression prediction (GPR) method. We develop the
generalized alternating direction implicit (GADI) framework with optimal
parameters, successfully integrating it as a smoother in algebraic multigrid
methods to solve linear systems. Moreover, we accelerate GPR using mixed
precision strategy and evaluate the predicted results with statistical
indicators. Further, we have successfully applied GPR to (time-dependent)
linear algebraic systems (elliptic equations, Poisson equations,
convection-diffusion equations, Helmholtz equations) and linear matrix
equations (Sylvester equations). Numerical results illustrate our methods can
save an enormous amount of time in selecting the relatively optimal splitting
parameters compared with the exists methods. When the system size exceeds
hundreds of thousands, the acceleration ratio of the GADI framework can reach
hundreds to thousands of times.
