0,4

An antichain on a set is a T_0-antichain if for every two distinct points of the set there exists a member of the antichain containing one but not the other point. T_1-hypergraph is a hypergraph which for every ordered pair (u,v) of distinct nodes has a hyperedge containing u but not v.

V. Jovovic and G. Kilibarda, On the number of Boolean functions in the Post classes F^{mu}_8, Diskretnaya Matematika, 11 (1999), no. 4, 127-138 (translated in Discrete Mathematics and Applications, 9, (1999), no. 6)

V. Jovovic, G. Kilibarda, On enumeration of the class of all monotone Boolean functions, in preparation.

V. Jovovic, 3-element unlabeled ordered T_0-antichains"

V. Jovovic, Number A(m,n) of m-element ordered T_0-antichains on an unlabeled n-set

[1, 1], [1, 2, 1], [0, 0, 1, 2, 1], [0, 0, 0, 2, 13, 26, 22, 8, 1], .... There are 72 3-element unlabeled ordered T_0-antichains: 2 on 3-set, 13 on 4-set, 26 on 5-set, 22 on 6-set, 8 on 7-set and 1 on 8-set.

Cf. A059049-A059052.

Sequence in context: A218380 A152815 A115296 * A257181 A164116 A164118

Adjacent sequences: A059045 A059046 A059047 * A059049 A059050 A059051

Vladeta Jovovic, Goran Kilibarda, Dec 19 2000

approved