Stanimirovic, Predrag and Ciric, Miroslav and Stojanovic, Igor and Gerontitis, Dimitrios (2017) Conditions for Existence, Representations, and Computation of Matrix Generalized Inverses. Complexity, 2017.
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Abstract
Conditions for the existence and representations of {2}-, {1}-, and {1, 2}-inverses which satisfy certain conditions on ranges and/or null spaces are introduced. These representations are applicable to complex matrices and involve solutions of certain matrix equations. Algorithms arising from the introduced representations are developed. Particularly, these algorithms can be used to compute the Moore-Penrose inverse, the Drazin inverse, and the usual matrix inverse. The implementation of introduced algorithms is defined on the set of real matrices and it is based on the Simulink implementation of GNN models for solving the involved matrix equations. In this way, we develop computational procedures which generate various classes of inner and outer generalized inverses on the basis of resolving certain matrix equations. As a consequence, some new relationships between the problem of solving matrix equations and the problem of numerical computation of generalized inverses are established.Theoretical results are applicable to
complex matrices and the developed algorithms are applicable to both the time-varying and time-invariant real matrices.
Item Type: | Article |
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Subjects: | Natural sciences > Computer and information sciences Engineering and Technology > Electrical engineering, electronic engineering, information engineering |
Divisions: | Faculty of Computer Science |
Depositing User: | Igor Stojanovik |
Date Deposited: | 09 Oct 2017 11:12 |
Last Modified: | 05 Nov 2019 13:01 |
URI: | https://eprints.ugd.edu.mk/id/eprint/18268 |
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