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Equations ax = c and xb = d in rings and rings with involution with applications to Hilbert space operators

✍ Scribed by Alegra Dajić; J.J. Koliha

Publisher
Elsevier Science
Year
2008
Tongue
English
Weight
320 KB
Volume
429
Category
Article
ISSN
0024-3795

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✦ Synopsis

This paper reviews the equations ax = c and xb = d from a new perspective by studying them in the setting of associative rings with or without involution. Results for rectangular matrices and operators between different Banach and Hilbert spaces are obtained by embedding the 'rectangles' into rings of square matrices or rings of operators acting on the same space. Necessary and sufficient conditions using generalized inverses are given for the existence of the Hermitian, skew-Hermitian, reflexive, antireflexive, positive and real-positive solutions, and the general solutions are described in terms of the original elements or operators. New results are obtained, and many results existing in the literature are recovered and corrected.

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