On the weak tightness, Hausdorff spaces, and power homogeneous compacta

Abstract

Motivated by results of Juh\'asz and van Mill in [13], we define the cardinal invariant wt(X), the weak tightness of a topological space X, and show that |X|≤ 2L(X)wt(X)(X) for any Hausdorff space X (Theorem 2.8). As wt(X)≤ t(X) for any space X, this generalizes the well-known cardinal inequality |X|≤ 2L(X)t(X)(X) for Hausdorff spaces (Arhangelskii~[1],Sapirovskii~[18]) in a new direction. Theorem 2.8 is generalized further using covers by G-sets, where is a cardinal, to show that if X is a power homogeneous compactum with a countable cover of dense, countably tight subspaces then |X|≤c, the cardinality of the continuum. This extends a result in [13] to the power homogeneous setting.