A note on tilted Sperner families with patterns

Abstract

Let p and q be two nonnegative integers with p+q>0 and n>0. We call F ⊂ P([n]) a (p,q)-tilted Sperner family with patterns on [n] if there are no distinct F,G ∈ F with: (i) \ \ p|F G|=q|G F|, \ and (ii) \ f > g \ for all \ f ∈ F G \ and \ g ∈ G F. Long (L) proved that the cardinality of a (1,2)-tilted Sperner family with patterns on [n] is O(e120 n\ 2nn). We improve and generalize this result, and prove that the cardinality of every (p,q)-tilted Sperner family with patterns on [n] is O( n \ 2nn).