Relaxed gradient-based iterative solutions to coupled Sylvester-conjugate transpose matrix equations of two unknowns
ISSN: 0264-4401
Article publication date: 1 November 2023
Issue publication date: 5 December 2023
Abstract
Purpose
This article proposes a relaxed gradient iterative (RGI) algorithm to solve coupled Sylvester-conjugate transpose matrix equations (CSCTME) with two unknowns.
Design/methodology/approach
This article proposes a RGI algorithm to solve CSCTME with two unknowns.
Findings
The introduced (RGI) algorithm is more efficient than the gradient iterative (GI) algorithm presented in Bayoumi (2014), where the author's method exhibits quick convergence behavior.
Research limitations/implications
The introduced (RGI) algorithm is more efficient than the GI algorithm presented in Bayoumi (2014), where the author's method exhibits quick convergence behavior.
Practical implications
In systems and control, Lyapunov matrix equations, Sylvester matrix equations and other matrix equations are commonly encountered.
Social implications
In systems and control, Lyapunov matrix equations, Sylvester matrix equations and other matrix equations are commonly encountered.
Originality/value
This article proposes a relaxed gradient iterative (RGI) algorithm to solve coupled Sylvester conjugate transpose matrix equations (CSCTME) with two unknowns. For any initial matrices, a sufficient condition is derived to determine whether the proposed algorithm converges to the exact solution. To demonstrate the effectiveness of the suggested method and to compare it with the gradient-based iterative algorithm proposed in [6] numerical examples are provided.
Keywords
Citation
Bayoumi, A.M.E. (2023), "Relaxed gradient-based iterative solutions to coupled Sylvester-conjugate transpose matrix equations of two unknowns", Engineering Computations, Vol. 40 No. 9/10, pp. 2776-2793. https://doi.org/10.1108/EC-07-2023-0370
Publisher
:Emerald Publishing Limited
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