Set families with a forbidden pattern

Abstract

A balanced pattern of order 2d is an element P ∈ \+,-\2d, where both signs appear d times. Two sets A,B ⊂ [n] form P-pattern, which we denote by pat(A,B) = P, if A B = \j1,… ,j2d\ with 1≤ j1<·s < j2d≤ n and \i∈ [2d]: Pi = + \ = \i∈ [2d]: ji ∈ A B\. We say A ⊂ P[n] is P-free if pat(A,B)≠ P for all A,B ∈ A. We consider the following extremal question: how large can a family A ⊂ P[n] be if A is P-free? We prove a number of results on the sizes of such families. In particular, we show that for some fixed c>0, if P is a d-balanced pattern with d < c n then | A| = o(2n). We then give stronger bounds in the cases when (i) P consists of d + signs, followed by d - signs and (ii) P consists of alternating signs. In both cases, if d = o( n) then | A | = o(2n). In the case of (i), this is tight. .