Commutativity Conditions in Algebras with $C^{\ast }$-equalities
DOI:
https://doi.org/10.26713/cma.v3i1.145Keywords:
Commutativity conditions, $C^{\ast }$-equality, Fuglede-Putnam-Rosenblum, Radjavi-Rosenthal, Ogasawara, Hirshfeld-ZelazkoAbstract
Departing from Fuglede-Putnam-Rosenblum's theorem, we examine several commutativity conditions in involutive algebras with $C^{\ast }$-equalities. Among questions considered are Ogasawara's theorem on operator algebras and Radjavi-Rosenthal's result on an algebra of normal operators. In the frame of $C^{\ast }$-algebras, conditions of apparently different natures turn out to be equivalent. Also, remarks are made about Hirshfeld-Zelazko's problem.Downloads
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Oudadess, M. (2012). Commutativity Conditions in Algebras with $C^{\ast }$-equalities. Communications in Mathematics and Applications, 3(1), 61–73. https://doi.org/10.26713/cma.v3i1.145
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