Cardinality bounds involving the skew-λ Lindel\"of degree and its variants

Abstract

We introduce a modified closing-off argument that results in several improved bounds for the cardinalities of Hausdorff and Urysohn spaces. These bounds involve the cardinal invariant skL(X,λ), the skew-λ Lindel\"of degree of a space X, where λ is a cardinal. skL(X,λ) is a weakening of the Lindel\"of degree and is defined as the least cardinal such that if U is an open cover of X then there exists V∈ [U]≤ such that |X|<λ. We show that if X is Hausdorff then |X|≤ 2skL(X,λ)t(X)(X), where λ= 2t(X)(X). This improves the well-known Arhangel'skii- Sapirovskii bound 2L(X)t(X)(X) for the cardinality of a Hausdorff space X. We additionally define several variations of skL(X,λ), establish other related cardinality bounds, and provide examples.