Kuratowski monoids of n-topological spaces
Abstract
Generalizing the famous 14-set closure-complement Theorem of Kuratowski from 1922, we prove that for a set X endowed with n pairwise comparable topologies τ1⊂…⊂τn, by repeated application of the operations of complement and closure in the topologies τ1,…,τn to a subset A⊂ X we can obtains at most 2K(n)=2Σi,j=0ni+jii+jj distinct sets.
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