On the free set number of topological spaces and their Gδ-modifications

Abstract

For a topological space X we propose to call a subset S ⊂ X "free in X" if it admits a well-ordering that turns it into a free sequence in X. The well-known cardinal function F(X) is then definable as \|S| : S is free in X\ and will be called the free set number of X. We prove several new inequalities involving F(X) and F(Xδ), where Xδ is the Gδ-modification of X: L(X) 22F(X) if X is T2 and L(X) 2F(X) if X is T3; |X| 22F(X) · c(X) 22F(X) · (X) for any T2-space X; F(Xδ) 222F(X) if X is T2 and F(Xδ) 22F(X) if X is T3.