The sequential topology on complete Boolean algebras
arXiv:math/9612207
Abstract
We investigate the sequential topology $Ï_s$ on a complete Boolean algebra $B$ determined by algebraically convergent sequences in $B$. We show the role of weak distributivity of $B$ in separation axioms for the sequential topology. The main result is that a necessary and sufficient condition for $B$ to carry a strictly positive Maharam submeasure is that $B$ is ccc and that the space $(B,Ï_s)$ is Hausdorff. We also characterize sequential cardinals.