On centered local π-bases

Abstract

In 1967 Hajnal and Juh\'asz showed that the cardinality of a first-countable Hausdorff space with the countable chain condition has cardinality at most c, the cardinality of the real line. We give an improvement of this celebrated theorem by replacing ``first-countable" with the weaker condition ``each point has a countable centered local π-base". Given a point p in a topological space X, a local π-base B at p acts like a neighborhood base at p except that p may not be in any member of B. A local π-base B has the finite intersection property if any finite intersection of members of B is nonempty. We call this type of local π-base centered. A centered local π-base behaves even more like a neighborhood base in a sense. A space has the countable chain condition if every family of pairwise disjoint open sets is countable. We also improve a theorem of Pospi sil from 1937 using centered local π-bases. As is customary, examples are given to demonstrate these improvements are strict. Compact Hausdorff spaces are also explored in this connection, along with variations on the notion of a centered local π-base.