Add to ORKGABSTRACT. In this note we prove the existence of operators which are not Tauberlan even though they satisfy properties about restrictions being Tauberian. The operators are defined on Banach spaces which contain a somewhat reflexive, non-reflexlve subspace. This gives an answer to a question proposed by R. Neidinger [i]. KEY WORDS AND PHARSES. Tauberian Operators, and Semi-Fredholm Operators
Upper semi-Fredholm operators and tauberian operators in Banach spaces admit the following perturbat...
ABSTRACT:We show that some counterexamples in the theory of tauberian operators can be realized as o...
In this paper we examine the relationship between the various subclasses of well-bounded operators...
ABSTRACT. In this note we prove the existence of operators which are not Tauberlan even though they ...
We show that a Banach space X has an infinite dimensional reflexive subspace (quotient) if and only ...
AbstractA theorem of Kalton and Wilansky asserts that a bounded linear operator between Banach space...
AbstractA theorem of Kalton and Wilansky asserts that a bounded linear operator between Banach space...
Let $T : D(T) ⊂ X → Y$ be a linear transformation where X and Y are normed spaces. We call T Tauberi...
Tauberian operators, which appeared in response to a problem in summability [GaW, KW] have found app...
Abstract. In archimedean analysis Tauberian operators and operators having property N were defined b...
Abstract. In archimedean analysis Tauberian operators and operators having property N were defined b...
Abstract. In archimedean analysis Tauberian operators and operators having property N were defined b...
Tauberian operators, which appeared in response to a problem in summability [GaW, KW] have found app...
AbstractA bounded linear operatorT:X→Y(Banach spaces) is defined to be Tauberian provided whenever {...
AbstractIn recent years some characterizations of the operators which preserve closed sets, closed b...
Upper semi-Fredholm operators and tauberian operators in Banach spaces admit the following perturbat...
ABSTRACT:We show that some counterexamples in the theory of tauberian operators can be realized as o...
In this paper we examine the relationship between the various subclasses of well-bounded operators...
ABSTRACT. In this note we prove the existence of operators which are not Tauberlan even though they ...
We show that a Banach space X has an infinite dimensional reflexive subspace (quotient) if and only ...
AbstractA theorem of Kalton and Wilansky asserts that a bounded linear operator between Banach space...
AbstractA theorem of Kalton and Wilansky asserts that a bounded linear operator between Banach space...
Let $T : D(T) ⊂ X → Y$ be a linear transformation where X and Y are normed spaces. We call T Tauberi...
Tauberian operators, which appeared in response to a problem in summability [GaW, KW] have found app...
Abstract. In archimedean analysis Tauberian operators and operators having property N were defined b...
Abstract. In archimedean analysis Tauberian operators and operators having property N were defined b...
Abstract. In archimedean analysis Tauberian operators and operators having property N were defined b...
Tauberian operators, which appeared in response to a problem in summability [GaW, KW] have found app...
AbstractA bounded linear operatorT:X→Y(Banach spaces) is defined to be Tauberian provided whenever {...
AbstractIn recent years some characterizations of the operators which preserve closed sets, closed b...
Upper semi-Fredholm operators and tauberian operators in Banach spaces admit the following perturbat...
ABSTRACT:We show that some counterexamples in the theory of tauberian operators can be realized as o...
In this paper we examine the relationship between the various subclasses of well-bounded operators...