Forbidden subposet problems for traces of set families

Abstract

In this paper we introduce a problem that bridges forbidden subposet and forbidden subconfiguration problems. The sets F1,F2, …,F|P| form a copy of a poset P, if there exists a bijection i:P→ \F1,F2, …,F|P|\ such that for any p,p'∈ P the relation p<P p' implies i(p)⊂neq i(p'). A family F of sets is P-free if it does not contain any copy of P. The trace of a family F on a set X is F|X:=\F X: F∈ F\. We introduce the following notions: F⊂eq 2[n] is l-trace P-free if for any l-subset L⊂eq [n], the family F|L is P-free and F is trace P-free if it is l-trace P-free for all l n. As the first instances of these problems we determine the maximum size of trace B-free families, where B is the butterfly poset on four elements a,b,c,d with a,b<c,d and determine the asymptotics of the maximum size of (n-i)-trace Kr,s-free families for i=1,2. We also propose a generalization of the main conjecture of the area of forbidden subposet problems.