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Star Order and Partial Isometries in C*-AlgebrasAbstract: We study the poset of partial isometries in C*-algebras endowed with the *-order
On a class of C-algebras generated by a countable family of partial isometries and can be represented as a countable sum of partial isometries. The C-algebras U φ, P φ and U φ
One class of C *-algebras generated by a family of partial isometries and multiplicators on the mentioned set. The partial isometry operators satisfy correlations defined by a prescribed map on the set
On a class of C-algebras generated by a countable family of partial isometries and can be represented as a countable sum of partial isometries. The C-algebras U φ, P φ and U φ
One class of C *-algebras generated by a family of partial isometries and multiplicators on the mentioned set. The partial isometry operators satisfy correlations defined by a prescribed map on the set
On the ideals of a C*-algebra generated by a family of partial isometries and multipliers on the Hilbert space l2 generated by the multiplier algebra and a family of partial isometries satisfying certain
On the ideals of a C*-algebra generated by a family of partial isometries and multipliers on the Hilbert space l2 generated by the multiplier algebra and a family of partial isometries satisfying certain
C*-algebras generated by mappings) is isomorphic to C *-algebra generated by a finite set of partial isometries of a special kind if T φ
On a Class of Operator Algebras Generated by a Family of Partial Isometries as a representation of the universal C*-algebra generated by a family of partial isometries satisfying
C*-Algebras Generated by Mappings. Criterion of Irreducibility of partial isometries acting on the corresponding l2(X). We study the structure of involutive semigroup
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