A topological approach for extending a representable linear functional $\omega$, defined on a topological quasi *-algebra without unit, to a representable linear functional defined on a quasi *-algebra with unit, is introduced. In particular, we suppose that $\omega$ is continuous and the positive sesquilinear form $\vom$, associated to $\omega$, is closable and prove that the extension $\overline{\vom}^e$ of the closure $\overline{\vom}$ is an i.p.s. form. By $\overline{\vom}^e$ we construct the desired extension.
Bellomonte, G. (2015). Extensions of Representable Positive Linear Functionals to Unitized Quasi *-Algebras: A New Method. MEDITERRANEAN JOURNAL OF MATHEMATICS, 12(3), 997-1008 [10.1007/s00009-014-0432-z].
Extensions of Representable Positive Linear Functionals to Unitized Quasi *-Algebras: A New Method
BELLOMONTE, Giorgia
2015-01-01
Abstract
A topological approach for extending a representable linear functional $\omega$, defined on a topological quasi *-algebra without unit, to a representable linear functional defined on a quasi *-algebra with unit, is introduced. In particular, we suppose that $\omega$ is continuous and the positive sesquilinear form $\vom$, associated to $\omega$, is closable and prove that the extension $\overline{\vom}^e$ of the closure $\overline{\vom}$ is an i.p.s. form. By $\overline{\vom}^e$ we construct the desired extension.
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