On HSS-Based Iteration Methods for Two Classes of Tensor Equations

Authors

Ming-Yu Deng google
Xue-Ping Guo School of Mathematical Sciences, Shanghai Key Laboratory of PMMP, East China Normal University, Shanghai 200241, P.R. China.

DOI:

https://doi.org/10.4208/eajam.140819.071019

Keywords:

Tensor equation, HSS iteration, k-mode product, convergence, large sparse system.

Abstract

HSS-based iteration methods for large systems of tensor equations $\mathcal{T}$($x$) = $b$ and $Ax$ = $\mathcal{T}$($x$) + $b$ are considered and conditions of their local convergence are presented. Numerical experiments show that for the equations $\mathcal{T}$($x$) = $b$, the Newton-HSS method outperforms the Newton-GMRES method. For nonlinear convection-diffusion equations the methods based on HSS iterations are generally more efficient and robust than the Newton-GMRES method.

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Published

2020-04-01

Issue

Vol. 10 No. 2 (2020)

Section

Articles