On a problem of Angelo Bella

Abstract

The main result of this note is the following theorem. "If X is any Hausdorff space with = F(X) · μ(X) then L(X< ) ()". Here F(X) is the smallest cardinal so that |S| < for any set S that is free in X and μ(X) is the smallest cardinal μ so that, for every set S that is free in X, any open cover of S has a subcover of size < μ. Moreover, X< is the G< -modification of X and () = \ : < = \. As a corollary we obtain that if X is a linearly Lindel\"of regular space of countable tightness then L(Xδ) c, provided that c = 2< c. This yields a consistent affirmative answer to a question of Angelo Bella.