Add to ORKGThe notion of a generalized effect algebra is presented as a generalization of effect algebra for an algebraic description of the structure of the set of all positive linear operators densely defined on a Hilbert space with the usual sum of operators. The structure of the set of not only positive linear operators can be described with the notion of a weakly ordered partial commutative group (wop-group).Due to the non-constructive algebraic nature of the wop-group we introduce its stronger version called a weakly ordered partial a-commutative group (woa-group). We show that it also describes the structure of not only positive linear operators
summary:It is shown that divisible effect algebras are in one-to-one correspondence with unit interv...
summary:We study unbounded versions of effect algebras. We show a necessary and sufficient condition...
AbstractWe consider bijections of the Hilbert space effect algebra that preserve the algebraic struc...
The notion of a generalized effect algebra is presented as a generalization of effect algebra for an...
We continue in the direction of our paper on PT-Symmetry in (Generalized) Effect Algebras and Partia...
We show that (generalized) effect algebras may be suitable very simple and natural algebraic structu...
We study the set of all positive linear operators densely defined in an infinite-dimensional complex...
We show that in any generalized effect algebra (G;⊕, 0) a maximal pairwise summable subset is a sub...
AbstractLet H be an infinite-dimensional Hilbert space and B(H) the algebra of all bounded linear op...
We consider subsets G of a generalized effect algebra E with 0∈G and such that every interval [0, q]...
summary:In this paper we deal with a pseudo effect algebra $\Cal A$ possessing a certain interpolat...
We show that isomorphism of effect algebras preserves properties of effect algebras derived from eff...
AbstractLet H be an infinite-dimensional complex Hilbert space and let B(H) be the algebra of all bo...
summary:An effect algebraic partial binary operation $øplus$ defined on the underlying set $E$ uniqu...
summary:We consider partial abelian monoids, in particular generalized effect algebras. From the giv...
summary:It is shown that divisible effect algebras are in one-to-one correspondence with unit interv...
summary:We study unbounded versions of effect algebras. We show a necessary and sufficient condition...
AbstractWe consider bijections of the Hilbert space effect algebra that preserve the algebraic struc...
The notion of a generalized effect algebra is presented as a generalization of effect algebra for an...
We continue in the direction of our paper on PT-Symmetry in (Generalized) Effect Algebras and Partia...
We show that (generalized) effect algebras may be suitable very simple and natural algebraic structu...
We study the set of all positive linear operators densely defined in an infinite-dimensional complex...
We show that in any generalized effect algebra (G;⊕, 0) a maximal pairwise summable subset is a sub...
AbstractLet H be an infinite-dimensional Hilbert space and B(H) the algebra of all bounded linear op...
We consider subsets G of a generalized effect algebra E with 0∈G and such that every interval [0, q]...
summary:In this paper we deal with a pseudo effect algebra $\Cal A$ possessing a certain interpolat...
We show that isomorphism of effect algebras preserves properties of effect algebras derived from eff...
AbstractLet H be an infinite-dimensional complex Hilbert space and let B(H) be the algebra of all bo...
summary:An effect algebraic partial binary operation $øplus$ defined on the underlying set $E$ uniqu...
summary:We consider partial abelian monoids, in particular generalized effect algebras. From the giv...
summary:It is shown that divisible effect algebras are in one-to-one correspondence with unit interv...
summary:We study unbounded versions of effect algebras. We show a necessary and sufficient condition...
AbstractWe consider bijections of the Hilbert space effect algebra that preserve the algebraic struc...