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proceedings of the american mathematical
society
Volume 71, Number 1, August 1978
SUBMETRIZABLESPACES AND ALMOST a-COMPACT FUNCTION SPACES R. A. MCCOY Abstract. It is shown that the space of real-valued continuous functions, with the compact-open topology, defined on a Urysohn Ar-spaceX is almost a-compact if and only if X is submetrizable.
A topological space X has a metrizable compression if its topology contains some metrizable topology on X. Such a space is also called submetrizable. A similar definition can be given for a space having a separable metrizable compression. A space is almost a-compact if it contains a dense a-compact subspace. Note that every separable space is almost a-compact. These concepts play an interesting role in the theory of functions spaces, as the following theorem found in [4] illustrates. The notation C„(X) and CK(X) are used to denote the space of real-valued continuous functions on X with the topology of pointwise convergence and the compact-open topology, respectively. Theorem 1. Let X be a completely regular space. (a) CV(X) is separable if and only if X has a separable compression. (b) CW(X) has a separable
metrizable
metrizable
compression if and only if X is
separable. •(c) CKiX) has a metrizable compression if and only if X is almost a-compact.
In this paper we prove a theorem which is dual to statement (c) of Theorem 1, just as (a) is dual to (b). This dual to (c) is: CK(X) is almost o-compact if and only if X has a metrizable compression. Unfortunately, the "only iF' part of this statement requires that X be a /c-space. This will be illustrated with an example. We shall use in our proof two well-known theorems. The versions of these theorems which we need are the following, and can be found in [3] and
[2]Theorem 2 (Ascoli Theorem). Let F be a closed subset of CKiX). (a) If F is pointwise bounded and equicontinuous, then F is compact. Presented to the Society, January 4, 1978 under the title Some topological properties of function spaces; received by the editors August 25, 1977 and, in revised form, October 18, 1977.
138 License or copyright restrictions may apply to redistribution; see http://www.ams.org/journal-terms-of-use
Society 1978
139
SUBMETRIZABLESPACES
(b) If X is a Hausdorff k-space and F is compact, then F is pointwise bounded and equicontinuous.
Theorem 3 (Stone-Weierstrass
Theorem). Every subalgebra of CK(X)
which contains a nonzero constant function and separates points is dense in CK(X).
First we take a submetrizable space and show that the space of real-valued continuous functions on it is almost o-compact. This can be proved for any topology on the function space which is larger than or equal the topology of pointwise convergence and smaller than or equal the compact-open topology. However, we only consider the compact-open topology here. Theorem 4. If X is submetrizable, then CK(X) is almost o-compact.
