The closure-complement-frontier problem in saturated polytopological spaces

TL;DR

This paper investigates the algebraic structure of operators generated by closures, frontiers, and complements in saturated polytopological spaces, establishing a sharp upper bound on the number of distinct sets produced.

Contribution

It extends Kuratowski's closure-complement theorem to saturated polytopological spaces, providing a precise maximum number of distinct sets generated by these operators.

Findings

The monoid of operators has at most 2p(n) elements, with p(n) a specific polynomial.

The bound is sharp; there exist spaces and sets achieving this maximum.

Explicit example in  with two topologies yields 120 distinct sets.

Abstract

Let $X$ be a space equipped with $n$ topologies $\tau_1,...,\tau_n$ which are pairwise comparable and saturated, and for each $1\leq i\leq n$ let $k_i$ and $f_i$ 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 $\mathcal{KF}_n$ generated by $\{k_i,f_i:1\leq i\leq n\}\cup\{c\}$ (where $c$ denotes the set complement operator) has cardinality no more than $2p(n)$ where $p(n)=\frac{5}{24}n^4+\frac{37}{12}n^3+\frac{79}{24}n^2+\frac{101}{12}n+2$. The bound is sharp in the following sense: for each $n$ there exists a saturated polytopological space $(X,\tau_1,...,\tau_n)$ and a subset $A\subseteq X$ such that repeated application of the operators $k_i, f_i, c$ 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 $\mathbb{R}$, equipped with the usual and Sorgenfrey topologies, which yields $2p(2)=120$ distinct sets under the action of the monoid $\mathcal{KF}_2$.