Newton-Shamanskii Method for a Quadratic Matrix Equation Arising in Quasi-Birth-Death Problems-Reference-Cited by-同舟云学术

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Newton-Shamanskii Method for a Quadratic Matrix Equation Arising in Quasi-Birth-Death Problems

Published:2014-11 Issue:4 Volume:4 Page:386-395
ISSN:2079-7362
Container-title:East Asian Journal on Applied Mathematics
language:en
Short-container-title:East Asian J. Appl. Math.

Author:

Guo Pei-Chang

Abstract

AbstractIn order to determine the stationary distribution for discrete time quasi-birth-death Markov chains, it is necessary to find the minimal nonnegative solution of a quadratic matrix equation. The Newton-Shamanskii method is applied to solve this equation, and the sequence of matrices produced is monotonically increasing and converges to its minimal nonnegative solution. Numerical results illustrate the effectiveness of this procedure.

Publisher

Global Science Press

Subject

Applied Mathematics

Reference17 articles.

1. Monotone convergence of Newton-like methods for M-matrix algebraic Riccati equations

2. Quadratic vector equations

3. A Shifted Cyclic Reduction Algorithm for Quasi-Birth-Death Problems

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1. Weight splitting iteration methods to solve quadratic nonlinear matrix equation MY2+NY+P=0;Journal of the Franklin Institute;2023-02

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