Regular Gδ-diagonals and some upper bounds for cardinality of topological spaces

Abstract

We prove that, under CH, any space with a regular Gδ-diagonal and caliber ω1 is separable; a corollary of this result answers, under CH, a question of Buzyakova. For any Urysohn space X, we establish the inequality |X| wL(X)s2(X)·dot(X) which represents a generalization of a theorem of Basile, Bella, and Ridderbos. We also show that if X is a Hausdorff space, then |X|(π(X)· d(X))ot(X)·c(X); this result implies Sapirovski's inequality |X|π(X)c(X)·(X) which only holds for regular spaces. It is also proved that |X| π(X)ot(X)·c(X)· aLc(X) for any Hausdorff space X; this gives one more generalization of the famous Arhangel's inequality |X| 2(X)· L(X).