Iterative methods for finding commuting solutions of the Yang–Baxter-like matrix equation
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摘要
The main goal of this paper is the numerical computation of solutions of the so-called Yang–Baxter-like matrix equation AXA=XAX, where A is a given complex square matrix. Two novel matrix iterations are proposed, both having second-order convergence. A sign modification in one of the iterations gives rise to a third matrix iteration. Strategies for finding starting approximations are discussed as well as a technique for estimating the relative error. One of the methods involves a very small cost per iteration and is shown to be stable. Numerical experiments are carried out to illustrate the effectiveness of the new methods.
论文关键词:Yang–Baxter-like matrix equation,Fréchet derivative,Iterative methods,Convergence,Stability,Idempotent matrix
论文评审过程:Received 29 December 2017, Accepted 19 March 2018, Available online 24 April 2018, Version of Record 24 April 2018.
论文官网地址:https://doi.org/10.1016/j.amc.2018.03.078