Free sequences and the tightness of pseudoradial spaces

Abstract

Let F(X) be the supremum of cardinalities of free sequences in X. We prove that the radial character of every Lindel\"of Hausdorff almost radial space X and the set-tightness of every Lindel\"of Hausdorff space are always bounded above by F(X). Solving a question of Bella, we exhibit a Hausdorff radial space X whose radial character is strictly larger than F(X). We then improve a result of Dow, Juh\'asz, Soukup, Szentmikl\'ossy and Weiss by proving that if X is a Lindel\"of Hausdorff space, and Xδ denotes the Gδ topology on X then t(Xδ) ≤ 2t(X). Finally, we exploit this to prove that if X is a Lindel\"of Hausdorff pseudoradial space then F(Xδ) ≤ 2F(X), which partially answer a question of Bella and ourselves.