Selective separability and q+ on maximal spaces

Abstract

Given a hereditarily meager ideal I on a countable set X we use Martin's axiom for countable posets to produce a zero-dimensional maximal topology τI on X such that τI I=\\ and, moreover, if I is p+ then τI is selectively separable (SS) and if I is q+, so is τI. In particular, we obtain regular maximal spaces satisfying all boolean combinations of the properties SS and q+.