The spatiality of derivations of quasi *-algebras is investigated by means of representation theory. Moreover, in view of physical applications, the spatiality of the limit of a family of spatial derivations is considere
A left-symmetric algebra A is said to be a derivation algebra if all its left and right multiplicati...
Continuing a previous analysis originally motivated by physics, we consider representable states on ...
In this paper some properties of continuous representable linear functionals on a quasi $*$-algebra ...
The spatiality of derivations of quasi *-algebras is investigated by means of representation theory....
The notion of *-derivation on an algebra of unbounded operators is extended to partial O*-algebras, ...
AbstractA CDC algebra is a reflexive operator algebra whose lattice is completely distributive and c...
The relationship between the GNS representations associated to states on a quasi *-algebra, which ar...
We show that any local derivation on the solvable Leibniz algebras whose nilradical is a quasi-filif...
Let (U, U-o) be a topological quasi *-algebra, which means in particular that U-o is a topological *...
The problem of exponentiating derivations of quasi *-algebras is considered in view of applying it t...
This book offers a review of the theory of locally convex quasi *-algebras, authored by two of its c...
A class of quasi *-algebras which exhibits some analogy with C*-algebras is studied. The extension o...
The spatial theory of *-automorphisms is well known for C*- or W*-algebras and for algebras for unbo...
In this paper we show how some known quasi *-algebras can also be obtained through the construction...
The work is devoted to the study of the spatial homological properties of the non-self-conjugated, m...
A left-symmetric algebra A is said to be a derivation algebra if all its left and right multiplicati...
Continuing a previous analysis originally motivated by physics, we consider representable states on ...
In this paper some properties of continuous representable linear functionals on a quasi $*$-algebra ...
The spatiality of derivations of quasi *-algebras is investigated by means of representation theory....
The notion of *-derivation on an algebra of unbounded operators is extended to partial O*-algebras, ...
AbstractA CDC algebra is a reflexive operator algebra whose lattice is completely distributive and c...
The relationship between the GNS representations associated to states on a quasi *-algebra, which ar...
We show that any local derivation on the solvable Leibniz algebras whose nilradical is a quasi-filif...
Let (U, U-o) be a topological quasi *-algebra, which means in particular that U-o is a topological *...
The problem of exponentiating derivations of quasi *-algebras is considered in view of applying it t...
This book offers a review of the theory of locally convex quasi *-algebras, authored by two of its c...
A class of quasi *-algebras which exhibits some analogy with C*-algebras is studied. The extension o...
The spatial theory of *-automorphisms is well known for C*- or W*-algebras and for algebras for unbo...
In this paper we show how some known quasi *-algebras can also be obtained through the construction...
The work is devoted to the study of the spatial homological properties of the non-self-conjugated, m...
A left-symmetric algebra A is said to be a derivation algebra if all its left and right multiplicati...
Continuing a previous analysis originally motivated by physics, we consider representable states on ...
In this paper some properties of continuous representable linear functionals on a quasi $*$-algebra ...
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