On weakening tightness to weak tightness

Abstract

The weak tightness wt(X) of a space X was introduced in [11] with the property wt(X)≤ t(X). We investigate several well-known results concerning t(X) and consider whether they extend to the weak tightness setting. First we give an example of a non-sequential compactum X such that wt(X)=0<t(X) under 20=21. In particular, this demonstrates the celebrated Balogh's Theorem [5] does not hold in general if countably tight is replaced with weakly countably tight. Second, we introduce the notion of an S-free sequence and show that if X is a homogeneous compactum then |X|≤ 2wt(X)π(X). This refines a theorem of De la Vega [12]. In the case where the cardinal invariants involved are countable, this also represents a variation of a theorem of Juh\'asz and van Mill [15]. Third, we show that if X is a T1 space, wt(X)≤, X is +-compact, and (D,X)≤ 2 for any D⊂eq X satisfying |D|≤ 2, then a) d(X)≤ 2 and b) X has at most 2-many G-points. This is a variation of another theorem of Balogh [6]. Finally, we show that if X is a regular space, =L(X)wt(X), and λ is a caliber of X satisfying <λ≤ (2)+, then d(X)≤ 2. This extends of theorem of Arhangel'skii [3].