Families of Subsets Without a Given Poset in the Interval Chains

Abstract

For two posets P and Q, we say Q is P-free if there does not exist any order-preserving injection from P to Q. The speical case for Q being the Boolean lattice Bn is well-studied, and the optiamal value is denoted as . Let us define (Q,P) to be the largest size of any P-free subposet of Q. In this paper, we give an upper bound for (Q,P) when Q is a double chain and P is any graded poset, which is better than the previous known upper bound, by means of finding the indpendence number of an auxiliary graph related to P. For the auxiliary graph, we can find its independence number in polynomial time. In addition, we give methods to construct the posets satisfying the Griggs-Lu conjecture.