On the cardinality of Hausdorff spaces and H-closed spaces

Abstract

We introduce the cardinal invariant aL(X) and show that |X|≤ 2aL(X)(X) for any Hausdorff space X (a corollary of Theorem 4.4. This invariant has the properties a) aL(X)=0 if X is H-closed, and b) aL(X)≤ aL(X)≤ aLc(X). Theorem 4.4 then gives a new improvement of the well-known Hausdorff bound 2L(X)(X) from which it follows that |X|≤ 2c(X) if X is H-closed (Dow/Porter [5]). The invariant aL(X) is constructed using convergent open ultrafilters and an operator c:P(X)P(X) with the property clA⊂eq c(A)⊂eq clθ(A) for all A⊂eq X. As a comparison with this open ultrafilter approach, in 3 we additionally give a -filter variation of Hodel's proof [10] of the Dow-Porter result. Finally, for an infinite cardinal , in 5 we introduce -closed spaces, H-closed spaces, and H-closed spaces. The first two notions generalize the H-closed property. Key results in this connection are that a) if is an infinite cardinal and X a -closed space with a dense set of isolated points such that (X)≤, then |X|≤ 2, and b) if X is H-closed or H-closed then aL(X)≤. This latter result relates these notions to the invariant aL(X) and the operator c.