The closure-complement-frontier problem in saturated polytopological spaces

Abstract

Let X be a space equipped with n topologies τ1,...,τn which are pairwise comparable and saturated, and for each 1≤ i≤ n let ki and fi be the associated topological closure and frontier operators, respectively. Inspired by the closure-complement theorem of Kuratowski, we prove that the monoid of set operators KFn generated by \ki,fi:1≤ i≤ n\\c\ (where c denotes the set complement operator) has cardinality no more than 2p(n) where p(n)=524n4+3712n3+7924n2+10112n+2. The bound is sharp in the following sense: for each n there exists a saturated polytopological space (X,τ1,...,τn) and a subset A⊂eq X such that repeated application of the operators ki, fi, c to A will yield exactly 2p(n) distinct sets. In particular, following the tradition for Kuratowski-type problems, we exhibit an explicit initial set in R, equipped with the usual and Sorgenfrey topologies, which yields 2p(2)=120 distinct sets under the action of the monoid KF2.