Mixed orthogonal arrays, k-dimensional M-part Sperner multi-families, and full multi-transversals

Abstract

Aydinian et al. [J. Combinatorial Theory A 118(2)(2011), 702-725] substituted the usual BLYM inequality for L-Sperner families with a set of M inequalities for (m1,m2,...,mM;L1,L2,...,LM) type M-part Sperner families and showed that if all inequalities hold with equality, then the family is homogeneous. Aydinian et al. [Australasian J. Comb. 48(2010), 133-141] observed that all inequalities hold with equality if and only if the transversal of the Sperner family corresponds to a simple mixed orthogonal array with constraint M, strength M-1, using mi+1 symbols in the ith column. In this paper we define k-dimensional M-part Sperner multi-families with parameters LP: P∈[M]k and prove Mk BLYM inequalities for them. We show that if k<M and all inequalities hold with equality, then these multi-families must be homogeneous with profile matrices that are strength M-k mixed orthogonal arrays. For k=M, homogeneity is not always true, but some necessary conditions are given for certain simple families. Following the methods of Aydinian et al. [Australasian J. Comb. 48(2010), 133-141], we give new constructions to simple mixed orthogonal arrays with constraint M, strength M-k, using mi+1 symbols in the ith column. We extend the convex hull method to k-dimensional M-part Sperner multi-families, and allow additional conditions providing new results even for simple 1-part Sperner families.