New bounds on the cardinality of Hausdorff spaces and regular spaces

Abstract

Using weaker versions of the cardinal function c(X), we derive a series of new bounds for the cardinality of Hausdorff spaces and regular spaces that do not involve c(X) nor its variants at all. For example, we show if X is regular then |X|≤ 2c(X)π(X) and |X|≤ 2c(X)π(X)ot(X), where the cardinal function ot(X), introduced by Tkachenko, has the property ot(X)≤\t(X),c(X)\. It follows from the latter that a regular space with cellularity at most c and countable π-character has cardinality at most 2c. For a Hausdorff space X we show |X|≤ 2d(X)π(X), |X|≤ d(X)π(X)ot(X), and |X|≤ 2π w(X)dot(X), where dot(X)≤\ot(X),π(X)\. None of these bounds involve c(X) or (X). By introducing the cardinal functions wc(X) and dc(X) with the property wc(X)dc(X)≤c(X) for a Hausdorff space X, we show |X|≤π(X)c(X)wc(X) if X is regular and |X|≤π(X)c(X)dc(X)wc(X) if X is Hausdorff. This improves results of Sapirovskii and Sun. It is also shown that if X is Hausdorff then |X|≤ 2d(X)wc(X), which appears to be new even in the case where wc(X) is replaced with c(X). Compact examples show that (X) cannot be replaced with dc(X)wc(X) in the bound 2(X) for the cardinality of a compact Hausdorff space X. Likewise, (X) cannot be replaced with dc(X)wc(X) in the Arhangel'skii-Sapirovskii bound 2L(X)t(X)(X) for the cardinality of a Hausdorff space X. Finally, we make several observations concerning homogeneous spaces in this connection.