The notion of *-derivation on an algebra of unbounded operators is extended to partial O*-algebras, and the corresponding notion of spatiality is investigated. Special emphasis is given to *-derivations associated to one-parameter groups of *-automorphisms and to *-derivations of partial GW*-algebras
AbstractA CDC algebra is a reflexive operator algebra whose lattice is completely distributive and c...
The work is devoted to the study of the spatial homological properties of the non-self-conjugated, m...
AbstractThe representations of the algebra of bounded finite rank operators on a normed space are st...
A spatial theory is developed for * - derivations of an algebra of unbounded operators, in terms of ...
The spatial theory of *-automorphisms is well known for C*- or W*-algebras and for algebras for unbo...
This paper reviews the theory of partial *-algebras of closable operators in Hilbert space (partial ...
This paper reviews the theory of partial *-algebras of closable operators in Hilbert space (partial ...
The spatiality of derivations of quasi *-algebras is investigated by means of representation theory....
this paper we discuss the bounded automorphisms of these algebras. In many cases we are able to conc...
We review the main points in the development of partial *-algebras, at three different levels: (i) ...
We review the main steps in the development of partial *-algebras. First we discuss the algebraic st...
We continue our study of topological partial *algebras focusing our attention to some basic spectral...
A definition of *-derivation of partial *-algebra through a sufficient family of ips-forms is propos...
This second paper on partial Op*-algebras is devoted to the theory of representations. A new definit...
The theory of derivations on operator algebras (in particular, C∗-algebras, AW ∗-algebras and W ∗-al...
AbstractA CDC algebra is a reflexive operator algebra whose lattice is completely distributive and c...
The work is devoted to the study of the spatial homological properties of the non-self-conjugated, m...
AbstractThe representations of the algebra of bounded finite rank operators on a normed space are st...
A spatial theory is developed for * - derivations of an algebra of unbounded operators, in terms of ...
The spatial theory of *-automorphisms is well known for C*- or W*-algebras and for algebras for unbo...
This paper reviews the theory of partial *-algebras of closable operators in Hilbert space (partial ...
This paper reviews the theory of partial *-algebras of closable operators in Hilbert space (partial ...
The spatiality of derivations of quasi *-algebras is investigated by means of representation theory....
this paper we discuss the bounded automorphisms of these algebras. In many cases we are able to conc...
We review the main points in the development of partial *-algebras, at three different levels: (i) ...
We review the main steps in the development of partial *-algebras. First we discuss the algebraic st...
We continue our study of topological partial *algebras focusing our attention to some basic spectral...
A definition of *-derivation of partial *-algebra through a sufficient family of ips-forms is propos...
This second paper on partial Op*-algebras is devoted to the theory of representations. A new definit...
The theory of derivations on operator algebras (in particular, C∗-algebras, AW ∗-algebras and W ∗-al...
AbstractA CDC algebra is a reflexive operator algebra whose lattice is completely distributive and c...
The work is devoted to the study of the spatial homological properties of the non-self-conjugated, m...
AbstractThe representations of the algebra of bounded finite rank operators on a normed space are st...
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