Artículo
Grothendieck locally convex spaces of continuous vector valued functions
Autor/es | Freniche Ibáñez, Francisco José |
Departamento | Universidad de Sevilla. Departamento de Análisis Matemático |
Fecha de publicación | 1985-12-01 |
Fecha de depósito | 2016-07-12 |
Publicado en |
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Resumen | Let ^{X, E) be the space of continuous functions from the completely regular Hausdorff space X into the Hausdorff locally convex space E, endowed with the compact-open topology. Our aim is to characterize the ^(X, E) spaces ... Let ^{X, E) be the space of continuous functions from the completely regular Hausdorff space X into the Hausdorff locally convex space E, endowed with the compact-open topology. Our aim is to characterize the ^(X, E) spaces which have the following property: weak-star and weak sequential convergences coincide in the equicontinuous subsets of ^(X, E)'. These spaces are here called Grothendieck spaces. It is shown that in the equicontinuous subsets of E' the σ(E', E)- and β(E', ^-sequential convergences coincide, if ^(X, E) is a Grothendieck space and X contains an infinite compact subset. Conversely, if X is a G-space and E is a strict inductive limit of Frechet-Montel spaces ^(X, E) is a Grothendieck space. Therefore, it is proved that if £ is a separable Frechet space, then E is a Montel space if and only if there is an infinite compact Hausdorff X such that , E) is a Grothendieck space. |
Cita | Freniche Ibáñez, F.J. (1985). Grothendieck locally convex spaces of continuous vector valued functions. Pacific Journal of Mathematics, 120 (2), 345-355. |
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