AbstractA linear subspace S of an algebra G is called reflexive if a ∈ S whenever a ∈ G and paq = 0 for every pair p, q of indempotents in G such that pSq = {0}. This paper studies properties of a Banach space that ensure that every separable norm closed linear subspace of the corrsponding Calkin algebra is reflexive. The latter holds for the spaces c0 and ℓp, 1 < p < ∞
We prove that a Banach space X with a supershrinking basis (a special type of shrinking basis) witho...
We study the question of when the set of norm attaining functionals on a Banach space is a linear sp...
AbstractIn this paper, we show that if S is an n-dimensional subspace of L(V) such that every nonzer...
AbstractThere is a close connection between separating vectors and reflexivity. But the existence of...
AbstractThe present paper studies in detail necessary and sufficient conditions for a subspace of a ...
AbstractA linear operator A is called reflexive if the only operators that leave invariant the invar...
AbstractWe prove some new results on Hadwin's general version of reflexivity that reduce the study o...
The concepts: reflexive, transitive, and elementary originally arose in invariant subspace theory. I...
This paper relates ideas in topology, functional analysis and ring the-ory. Suppose K is a compact H...
A cone K in a vector space X is a subset which is closed under addition, positive scalar multiplicat...
Abstract 1 Let X be a Banach space with a basis. We prove that X is reflexive if and only if every p...
AbstractA linear operator A is called reflexive if the only operators that leave invariant the invar...
In this paper we prove that if E and F are reflexive Banach spaces and G is a closed linear subspace...
AbstractThere is a close connection between separating vectors and reflexivity. But the existence of...
Abstract. We show that any n-dimensional subspace of B(H) is [ 2n]-reflexive, where [t] denotes the ...
We prove that a Banach space X with a supershrinking basis (a special type of shrinking basis) witho...
We study the question of when the set of norm attaining functionals on a Banach space is a linear sp...
AbstractIn this paper, we show that if S is an n-dimensional subspace of L(V) such that every nonzer...
AbstractThere is a close connection between separating vectors and reflexivity. But the existence of...
AbstractThe present paper studies in detail necessary and sufficient conditions for a subspace of a ...
AbstractA linear operator A is called reflexive if the only operators that leave invariant the invar...
AbstractWe prove some new results on Hadwin's general version of reflexivity that reduce the study o...
The concepts: reflexive, transitive, and elementary originally arose in invariant subspace theory. I...
This paper relates ideas in topology, functional analysis and ring the-ory. Suppose K is a compact H...
A cone K in a vector space X is a subset which is closed under addition, positive scalar multiplicat...
Abstract 1 Let X be a Banach space with a basis. We prove that X is reflexive if and only if every p...
AbstractA linear operator A is called reflexive if the only operators that leave invariant the invar...
In this paper we prove that if E and F are reflexive Banach spaces and G is a closed linear subspace...
AbstractThere is a close connection between separating vectors and reflexivity. But the existence of...
Abstract. We show that any n-dimensional subspace of B(H) is [ 2n]-reflexive, where [t] denotes the ...
We prove that a Banach space X with a supershrinking basis (a special type of shrinking basis) witho...
We study the question of when the set of norm attaining functionals on a Banach space is a linear sp...
AbstractIn this paper, we show that if S is an n-dimensional subspace of L(V) such that every nonzer...
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