GO-spaces with S_\delta-diagonals and dense S_\delta-diagonals
by
Masami Hosobuchi
Tokyo Kasei Gakuin University

Abstract

A concept of S_\delta-diagonal was introduced by R. H. Bennett to study the quasi-developability of linearly ordered topological spaces.

Definition. A subset A of a space X is called an S_\delta-subset if there exists a collection {U(n):n in N} of open subsets of X such that, for p in A and q in X \A, there exists an m in N such that p in U(m) and q not in U(m). A space X has an S_\delta-diagonal if the diagonal subset \Delta of X ×X is an S_\delta-subset.

Theorem 1. Let X be a topological space. Then X has an S_\delta-diagonal if and only if there exists a family {G(n):n in N} of countable collections of open subsets of X such that, for three points x, y and z, where y =/= z, there exists an m in N such that x in \cup G(m) and no elements of G(m) contain {y, z}.

Corollary. If X has a G_\delta-diagonal, then X has an S_\delta-diagonal. If X has an S_\delta-diagonal, then X has a quasi-G_\delta-diagonal.

Theorem 2. Let X be a GO-space with an S_\delta-diagonal. If R \cup L is countable, then X^* has an S_\delta-diagonal. If, furthermore, for x in R (respectively, y in L), there exists an increasing sequence {x_n} (resp. a decreasing sequence {y_n}) such that sup{x_n}=x (resp. inf{y_n}=y), then L(X) has an S_\delta-diagonal.

Definition. A Hausdorff space X has a dense S_\delta-diagonal if there exists a dense subset of the diagonal \Delta that is an S_\delta-subset of X ×X.

Theorem 3. Suppose that X is a GO-space that has a dense S_\delta-diagonal. If R \cup L is countable, then X^* and L(X) have dense S_\delta-diagonals.

Date received: July 15, 2001