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Topological subspaces of free topological groups
by
Kohzo Yamada
Shizuoka University
Let F(X) and A(X) be respectively the free topological group and the free abelian topological group on a Tychonoff space X. In this talk, we discuss the following topological properties:
(1) locally compactness, (2) Cech-completeness, (3) point-countable type, (4) first countability, (5) Fréchetness, (6) sequentiality, (7) k-property
However there are some concrete spaces X such that F(X) and A(X) have the properties (6) and (7), it is known that neither F(X) nor A(X) on a non-discrete space X has the properties (1) ~ (5). On the other hand, if X is a compact metric space, then both of Fn(X) and An(X) have these properties for each n in \omega, where Fn(X) and An(X) are subsets of F(X) and A(X), respectively, formed by all words whose reduced length is less than or equal to n. In this talk, we show that there is a subspace of F(X) (A(X)) which is not contained in any Fn(X) (An(X)) such that it has the properties (1) ~ (5), every such a subspace with the properties (1) ~ (4) must have a special form in F(X) (A(X)) and there is a Fréchet subspace of F(X) (A(X)) without the form such that it isn't contained any Fn(X) (An(X)).
Recently we obtained the equivalent conditions of a metrizable space X such that every or some Fn(X) (An(X)) is metrizable and proved that for a metrizable space X and n >= 2, if Fn(X) (An(X)) is first countable, then it is metrizable, respectively. Here, we also discuss the conditions of a metrizable space X such that every or some Fn(X) (An(X)) is Fréchet.
Date received: June 28, 1999
Copyright © 1999 by the author(s). The author(s) of this document and the organizers of the conference have granted their consent to include this abstract in Atlas Conferences Inc. Document # caby-24.