Search results for "Commutative property"

showing 4 items of 34 documents

Completely positive invariant conjugate-bilinear maps on partial *-algebras

2007

The notion of completely positive invariant conjugate-bilinear map in a partial *-algebra is introduced and a generalized Stinespring theorem is proven. Applications to the existence of integrable extensions of *-representations of commutative, locally convex quasi*-algebras are also discussed.

Pure mathematicsIntegrable systemApplied MathematicsRegular polygonFOS: Physical sciencesBilinear interpolationMathematical Physics (math-ph)Completely positive mapSettore MAT/05 - Analisi MatematicaPartial O*-algebrasPartial *-algebraInvariant (mathematics)Commutative propertySettore MAT/07 - Fisica MatematicaAnalysisMathematical PhysicsConjugateMathematics
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Sobriety and spatiality in varieties of algebras

2008

The paper considers a generalization of the classical Papert-Papert-Isbell adjunction between the categories of topological spaces and locales to an arbitrary variety of algebras and illustrates the obtained results by the category of algebras over a given unital commutative quantale.

Pure mathematicsLogicGeneralizationQuantaleFuzzy setMathematics::General TopologyT-normTopological spaceAdjunctionArtificial IntelligenceMathematics::Category TheoryVariety (universal algebra)Commutative propertyMathematicsFuzzy Sets and Systems
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Polaroid-Type Operators

2018

In this chapter we introduce the classes of polaroid-type operators, i.e., those operators T ∈ L(X) for which the isolated points of the spectrum σ(T) are poles of the resolvent, or the isolated points of the approximate point spectrum σap(T) are left poles of the resolvent. We also consider the class of all hereditarily polaroid operators, i.e., those operators T ∈ L(X) for which all the restrictions to closed invariant subspaces are polaroid. The class of polaroid operators, as well as the class of hereditarily polaroid operators, is very large. We shall see that every generalized scalar operator is hereditarily polaroid, and this implies that many classes of operators acting on Hilbert s…

symbols.namesakePure mathematicsOperator (computer programming)Scalar (mathematics)Hilbert spacesymbolsLocally compact spaceAbelian groupLinear subspaceCommutative propertyMathematicsResolvent
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Commutative Partial O*-Algebras

2002

This chapter is devoted to the integrability of commutative partial O*-algebras. Three notions of weak commutativity, commutativity and strong commutativity of an O*-vector space are defined and investigated. In Section 3.1, we analyze the relation between the integrability of weakly commutative O*-vector space M and the commutativity of the von Neumann algebra (M w ′ )′. In Section 3.2, we study the integrable extensions of partial O*-algebras. In Section 3.3, we describe another explicit example, namely, the partial O*-algebra M[S, T] generated by two weakly commuting symmetric operators S and T defined on a common dense domain in a Hilbert space. In particular, we investigate in detail t…

symbols.namesakePure mathematicsSection (category theory)Von Neumann algebraDomain (ring theory)Hilbert spacesymbolsStructure (category theory)Algebraic extensionSpace (mathematics)Commutative propertyMathematics
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