Cardinal inequalities for S(n)-spaces

Abstract

Hajnal and Juh\'asz proved that if X is a T1-space, then |X| 2s(X)(X), and if X is a Hausdorff space, then |X| 2c(X)(X) and |X| 22s(X). Schr\"oder sharpened the first two estimations by showing that if X is a Hausdorff space, then |X| 2Us(X)c(X), and if X is a Urysohn space, then |X| 2Uc(X)(X). In this paper, for any positive integer n and some topological spaces X, we define the cardinal functions n(X), n(X), sn(X), and cn(X), called respectively S(n)-character, S(n)-pseudocharacter, S(n)-spread, and S(n)-cellularity, and using these new cardinal functions we show that the above-mentioned inequalities could be extended to the class of S(n)-spaces. We recall that the S(1)-spaces are exactly the Hausdorff spaces and the S(2)-spaces are exactly the Urysohn spaces.