We prove a Hermitian analog of the well-known operator triangle inequality for vonNeumann algebras. In the semifinite case we show that a block projection operator is a linear positive contraction on a wide class of solid spaces of Segal measurable operators. We describe some applications of the results. © 2012 Allerton Press, Inc

Bikchentaev A.

Russian Mathematics

Kazan Federal University Digital Repository

Russian Mathematics 2012 vol.56 N2, pages 75-79Block projection operators in normed solid spaces ofmeasurable operatorsBikchentaev A.Kazan Federal University, 420008, Kremlevskaya 18, Kazan, RussiaAbstractWe prove a Hermitian analog of the well-known operator triangle inequality for vonNeumannalgebras. In the semifinite case we show that a block projection operator is a linear positivecontraction on a wide class of solid spaces of Segal measurable operators. We describe someapplications of the results. © 2012 Allerton Press, Inc.http://dx.doi.org/10.3103/S1066369X12020107KeywordsBlock projection operator, Normal semifinite trace, Solid space of measurable operators,Triangle inequality, Von Neumann algebra

Block projection operators in normed solid spaces of measurable operators

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Block projection operators in normed solid spaces of measurable operators

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