Über einen graphensatz für lineare abbildungen mit metrisierbarem zielraum
Identifieur interne : 002F77 ( Main/Exploration ); précédent : 002F76; suivant : 002F78Über einen graphensatz für lineare abbildungen mit metrisierbarem zielraum
Auteurs : Volker Eberhardt [Allemagne] ; Walter Roelcke [Allemagne]Source :
- manuscripta mathematica [ 0025-2611 ] ; 1974-03-01.
Abstract
Abstract: In [2] those locally convex spaces E, called GN-spaces, were investigated, for which every closed linear mapping from E to any normed space F is continuous. Here we study the smaller class of spaces E, called GM-spaces, which arise by admitting now for F all metrizable locally convex spaces. The GM-spaces have characterizations and permanence properties similar to those for GN-spaces. Main results are the barrelledness of every dense subspace of a GM-space, the finite dimension of the bounded subsets of separated GM-spaces, an embedding theorem., and the existence of separated GM-spaces which do not have the finest locally convex topology.
Url:
DOI: 10.1007/BF01168742
Affiliations:
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<front><div type="abstract" xml:lang="en">Abstract: In [2] those locally convex spaces E, called GN-spaces, were investigated, for which every closed linear mapping from E to any normed space F is continuous. Here we study the smaller class of spaces E, called GM-spaces, which arise by admitting now for F all metrizable locally convex spaces. The GM-spaces have characterizations and permanence properties similar to those for GN-spaces. Main results are the barrelledness of every dense subspace of a GM-space, the finite dimension of the bounded subsets of separated GM-spaces, an embedding theorem., and the existence of separated GM-spaces which do not have the finest locally convex topology.</div>
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