A construction for partially ordered sets

A construction I(S) is defined which corresponds to the intuitive notion of the set of places in which new elements can be inserted into a given poset S. It is given the minimal possible ordering. It turns out that if the base sets are chains the construction produces the corresponding interval orders. for whose dimensions there exist good estimates. In this paper we make the dual restriction that the height of the underlying set is ?1. Under this assumption we find a bound for the dimension of I(S) in general and a precise value if the set consists of two antichains all the elements of one lying above all those of the other.