Length of an intersection

Abstract

A poset is well-partially ordered (WPO) if all its linear extensions are well orders~; the supremum of ordered types of these linear extensions is the length, () of . We prove that if the vertex set X of is infinite, of cardinality , and the ordering ≤ is the intersection of finitely many partial orderings ≤i on X, 1≤ i≤ n, then, letting (X,≤i)=μltordby qi+ri, with ri<, denote the euclidian division by (seen as an initial ordinal) of the length of the corresponding poset~:\[ ()< μltordby1≤ i≤ nqi+ |Σ1≤ i≤ n ri|+ \] where |Σ ri|+ denotes the least initial ordinal greater than the ordinal Σ ri. This inequality is optimal (for n≥ 2).