Forbidding rank-preserving copies of a poset

Abstract

The maximum size, La(n,P), of a family of subsets of [n]=\1,2,...,n\ without containing a copy of P as a subposet, has been intensively studied. Let P be a graded poset. We say that a family F of subsets of [n]=\1,2,...,n\ contains a rank-preserving copy of P if it contains a copy of P such that elements of P having the same rank are mapped to sets of same size in F. The largest size of a family of subsets of [n]=\1,2,...,n\ without containing a rank-preserving copy of P as a subposet is denoted by Larp(n,P). Clearly, La(n,P) Larp(n,P) holds. In this paper we prove asymptotically optimal upper bounds on Larp(n,P) for tree posets of height 2 and monotone tree posets of height 3, strengthening a result of Bukh in these cases. We also obtain the exact value of Larp(n,\Yh,s,Yh,s'\) and La(n,\Yh,s,Yh,s'\), where Yh,s denotes the poset on h+s elements x1,…,xh,y1,…,ys with x1<…<xh<y1,…,ys and Y'h,s denotes the dual poset of Yh,s.