Montel subspaces of Fréchet spaces of Moscatelli type-Reference-Cited by-同舟云学术

Montel subspaces of Fréchet spaces of Moscatelli type

Published:1997-09 Issue:3 Volume:39 Page:345-350
ISSN:0017-0895
Container-title:Glasgow Mathematical Journal
language:en
Short-container-title:Glasgow Math. J.

Author:

Albanese Angela A.

Abstract

In this note we show that every complemented Montel subspace F of a Fréchet space E of Moscatelli type is isomorphic to ω or is finite–dimensional; the last case always occurs when E has a continuous norm. To do this, we first study the topology induced by E on its Montel subspaces, extending a result on Fr6chet-Montel spaces of Moscatelli type in [4].We recall that the Fréchet spaces of Moscatelli type were introduced and studied by J. Bonet and S. Dierolf in [4]; the general idea behind the construction of such spaces was due to V. B. Moscatelli [7].

Publisher

Cambridge University Press (CUP)

Subject

General Mathematics

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