On L-close Sperner systems

Abstract

For a set L of positive integers, a set system F ⊂eq 2[n] is said to be L-close Sperner, if for any pair F,G of distinct sets in F the skew distance sd(F,G)=\|F G|,|G F|\ belongs to L. We reprove an extremal result of Boros, Gurvich, and Milani c on the maximum size of L-close Sperner set systems for L=\1\ and generalize to |L|=1 and obtain slightly weaker bounds for arbitrary L. We also consider the problem when L might include 0 and reprove a theorem of Frankl, F\"uredi, and Pach on the size of largest set systems with all skew distances belonging to L=\0,1\.