It is shown that a series of positive terms that converges on all sets of null density should be convergent. Using this result we construct examples of complete topological vector spaces that are proper subspaces of a Banach space, but whose dual spaces coincide with the dual space of the Banach space. © 1986 American Mathematical Society
50 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1988.We find sufficient conditions ...
AbstractWe study Banach spaces satisfying some geometric or structural properties involving tightnes...
If λ is a scalar sequence space, a series P zj in a topological vec-tor space Z is λ multiplier conv...
In this thesis we introduce several different types of series convergence in nor- med vector spaces ...
The hyperspace consists of all the subsets of a vector space. It is well-known that the hyperspace i...
In this paper, we try to state a reciprocal of . a result of A. Wilansky : The dual of a Mazur space...
Abstract. We discuss some old results due to Abel and Olivier concerning the convergence of positive...
It is known from functional analysis that in classical calculus, the sets , , , and of all bounded...
In this article, we formalize topological properties of real normed spaces. In the first part, open ...
We aim to unify several results which characterize when a series is weakly unconditionally Cauchy (...
AbstractLet B be a Banach space. A B-valued sequence 〈 xk〉 is weakly statistically null provided lim...
Abstract. A topological space X is a -space provided that, for every sequence hfni1n=0 of continuous...
In this manuscript we characterize the completeness of a normed space through the strong lacunary (N...
n this paper we give a new proof of a known diophantine approximation result, then we apply this to ...
Abstract. We give some properties for convergent sequences of sets in a topological vector space whi...
50 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1988.We find sufficient conditions ...
AbstractWe study Banach spaces satisfying some geometric or structural properties involving tightnes...
If λ is a scalar sequence space, a series P zj in a topological vec-tor space Z is λ multiplier conv...
In this thesis we introduce several different types of series convergence in nor- med vector spaces ...
The hyperspace consists of all the subsets of a vector space. It is well-known that the hyperspace i...
In this paper, we try to state a reciprocal of . a result of A. Wilansky : The dual of a Mazur space...
Abstract. We discuss some old results due to Abel and Olivier concerning the convergence of positive...
It is known from functional analysis that in classical calculus, the sets , , , and of all bounded...
In this article, we formalize topological properties of real normed spaces. In the first part, open ...
We aim to unify several results which characterize when a series is weakly unconditionally Cauchy (...
AbstractLet B be a Banach space. A B-valued sequence 〈 xk〉 is weakly statistically null provided lim...
Abstract. A topological space X is a -space provided that, for every sequence hfni1n=0 of continuous...
In this manuscript we characterize the completeness of a normed space through the strong lacunary (N...
n this paper we give a new proof of a known diophantine approximation result, then we apply this to ...
Abstract. We give some properties for convergent sequences of sets in a topological vector space whi...
50 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1988.We find sufficient conditions ...
AbstractWe study Banach spaces satisfying some geometric or structural properties involving tightnes...
If λ is a scalar sequence space, a series P zj in a topological vec-tor space Z is λ multiplier conv...