Free Skew Boolean Intersection Algebras and Set Partitions

Abstract: We show that atoms of the n-generated free left-handed skew Boolean intersection algebra are in a bijective correspondence with pointed partitions of non-empty subsets of {1, 2, . . . , n}. Furthermore, under the canonical inclusion into the k-generated free algebra, where k ≥ n, an atom of the n-generated free algebra decomposes into an orthogonal join of atoms of the k-generated free algebra in an agreement with the containment relation on the respective partitions. As a consequence of these results, we desc… Show more

“…Given n generators, these counts are respectively B n+1 − 1 and B n+2 − 2B n+1 . (Again, see [38,Theorem 28]. )…”

“…But instead of binomial coefficients n k−1 , the respective powers are given by Stirling numbers of the 2 nd kind, n+1 k . (See [38,Theorem 28].) Research on skew lattices and related subjects continues.…”

“…(The n th Bell number B n is the number of distinct partitions of an n-element set.) Interestingly, Bell numbers appear in Anya Kudryavtseva's paper [38] where they are used to count the number of atomic D-classes as well as the total number of atoms in a free left [right]-handed skew Boolean intersection algebra. Given n generators, these counts are respectively B n+1 − 1 and B n+2 − 2B n+1 .…”

My journey into noncommutative lattices and their theory

“…Given n generators, these counts are respectively B n+1 − 1 and B n+2 − 2B n+1 . (Again, see [38,Theorem 28]. )…”

“…But instead of binomial coefficients n k−1 , the respective powers are given by Stirling numbers of the 2 nd kind, n+1 k . (See [38,Theorem 28].) Research on skew lattices and related subjects continues.…”

“…(The n th Bell number B n is the number of distinct partitions of an n-element set.) Interestingly, Bell numbers appear in Anya Kudryavtseva's paper [38] where they are used to count the number of atomic D-classes as well as the total number of atoms in a free left [right]-handed skew Boolean intersection algebra. Given n generators, these counts are respectively B n+1 − 1 and B n+2 − 2B n+1 .…”

My journey into noncommutative lattices and their theory