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Extending quasi-GMRES method to solve generalized Sylvester tensor equations via the Einstein product

Publish place: Iranian Journal of Numerical Analysis and Optimization، Vol: 14، Issue: 30
Publish Year: 1403
نوع سند: مقاله ژورنالی
زبان: English
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لینک ثابت به این Paper:
https://civilica.com/doc/2066138

شناسه ملی سند علمی:

JR_IJNAO-14-30_011

تاریخ نمایه سازی: 17 شهریور 1403

Abstract:

This paper aims to extend a Krylov subspace technique based on an in-complete orthogonalization of Krylov tensors (as a multidimensional exten-sion of the common Krylov vectors) to solve generalized Sylvester tensor equations via the Einstein product. First, we obtain the tensor form of the quasi-GMRES method, and then we lead to the direct variant of the proposed algorithm. This approach has the great advantage that it uses previous data in each iteration and has a low computational cost. More-over, an upper bound for the residual norm of the approximate solution is found. Finally, several experimental problems are given to show the acceptable accuracy and efficiency of the presented method.

Keywords:

Generalized Sylvester tensor equations , Einstein product , Quasi-GMRES method , Convergence Analysis

Authors

M.M. Izadkhah

Department of Computer Science, Faculty of Computer and Industrial Engineering, Birjand University of Technology, Birjand, Iran.

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