Boundary-Border Extensions of the Kuratowski Monoid

Abstract

The Kuratowski monoid K is generated under operator composition by closure and complement in a nonempty topological space. It satisfies 2≤|K|≤14. The Gaida-Eremenko (or GE) monoid KF extends K by adding the boundary operator. It satisfies 4≤|KF|≤34. We show that when |K|<14 the GE monoid is determined by K. When |K|=14 if the interior of the boundary of every subset is clopen, then |KF|=28. This defines a new type of topological space we call Kuratowski\ disconnected. Otherwise |KF|=34. When applied to an arbitrary subset the GE monoid collapses in one of 70 possible ways. We investigate how these collapses and KF interdepend, settling two questions raised by Gardner and Jackson. Computer experimentation played a key role in our research.