On the number of containments in P-free families

Abstract

A subfamily \F1,F2,…,F|P|\⊂eq F is a copy of the poset P if there exists a bijection i:P→ \F1,F2,…,F|P|\ such that pP q implies i(p)⊂eq i(q). A family F is P-free, if it does not contain a copy of P. In this paper we establish basic results on the maximum possible number of k-chains in a P-free family F⊂eq 2[n]. We prove that if the height of P, h(P) > k, then this number is of the order (Πi=1k+1li-1li), where l0=n and l1 l2 … lk+1 are such that n-l1,l1-l2,…, lk-lk+1,lk+1 differ by at most one. On the other hand if h(P) k, then we show that this number is of smaller order of magnitude. Let r denote the poset on r+1 elements a, b1, b2, …, br, where a < bi for all 1 i r and let r denote its dual. For any values of k and l, we construct a \k,l\-free family and we conjecture that it contains asymptotically the maximum number of pairs in containment. We prove that this conjecture holds under the additional assumption that a chain of length 4 is forbidden. Moreover, we prove the conjecture for some small values of k and l. We also derive the asymptotics of the maximum number of copies of certain tree posets T of height 2 in \k,l\-free families F ⊂eq 2[n].