Add to ORKGWe give sufficient conditions on a domain Ω so that the associated canonical model is reflexive. Also, we discuss a class of shifts that are reflexive, and the operator Mz of multiplication by z on a Banach space of functions analytic on a domain is shown to be reflexive whenever Mz is polynomially bounde
We prove that any set of commuting isometries on a separable Hilbert space is reflexive
summary:For a topological space $X$, let $S(X)$ denote the set of all closed subsets in $X$, and let...
summary:We show that for a linear space of operators ${\mathcal M}\subseteq {\mathcal B}(\scr {H}_1,...
. Let X be a Banach space of functions analytic on a plane domain Ω such that for every λ in Ω the ...
Let be reflexive Banach space of functions analytic plane domain Ω such that for every λ in Ω the f...
AbstractA linear operator A is called reflexive if the only operators that leave invariant the invar...
Abstract. Let T, T ′ be weak contractions (in the sense of Sz.-Nagy and Foiaş), m, m ′ the minimal ...
Abstract: We characterize the commutants of some multiplication operators on a Banach space of analy...
This paper relates ideas in topology, functional analysis and ring the-ory. Suppose K is a compact H...
Abstract. We introduce a concept “bounded reflexivity ” for a subspace of operators on a normed spac...
Abstract 1 Let X be a Banach space with a basis. We prove that X is reflexive if and only if every p...
Domains for the pure -calculus, sometimes called reflexive domains, can be constructed in several wa...
In this note we deal with a version of James' Theorem for numerical radius, which was already consid...
AbstractThere is a close connection between separating vectors and reflexivity. But the existence of...
AbstractWe introduce a new version of reflexivity, akin to approximate reflexivity, called Asymptoti...
We prove that any set of commuting isometries on a separable Hilbert space is reflexive
summary:For a topological space $X$, let $S(X)$ denote the set of all closed subsets in $X$, and let...
summary:We show that for a linear space of operators ${\mathcal M}\subseteq {\mathcal B}(\scr {H}_1,...
. Let X be a Banach space of functions analytic on a plane domain Ω such that for every λ in Ω the ...
Let be reflexive Banach space of functions analytic plane domain Ω such that for every λ in Ω the f...
AbstractA linear operator A is called reflexive if the only operators that leave invariant the invar...
Abstract. Let T, T ′ be weak contractions (in the sense of Sz.-Nagy and Foiaş), m, m ′ the minimal ...
Abstract: We characterize the commutants of some multiplication operators on a Banach space of analy...
This paper relates ideas in topology, functional analysis and ring the-ory. Suppose K is a compact H...
Abstract. We introduce a concept “bounded reflexivity ” for a subspace of operators on a normed spac...
Abstract 1 Let X be a Banach space with a basis. We prove that X is reflexive if and only if every p...
Domains for the pure -calculus, sometimes called reflexive domains, can be constructed in several wa...
In this note we deal with a version of James' Theorem for numerical radius, which was already consid...
AbstractThere is a close connection between separating vectors and reflexivity. But the existence of...
AbstractWe introduce a new version of reflexivity, akin to approximate reflexivity, called Asymptoti...
We prove that any set of commuting isometries on a separable Hilbert space is reflexive
summary:For a topological space $X$, let $S(X)$ denote the set of all closed subsets in $X$, and let...
summary:We show that for a linear space of operators ${\mathcal M}\subseteq {\mathcal B}(\scr {H}_1,...