The structure of interval orders with no infinite antichain

Abstract

We prove that if G=(V,E) is a nonprime graph with either no infinite independent set or no infinite clique, then every vertex of G belongs to a maximal strong module distinct from V. In particular, G admits a Gallai decomposition. As a consequence, we obtain that every interval order P with no infinite antichain admits a Gallai decomposition. That is, P is a lexicographical sum of interval orders distinct from P indexed by either a chain, an antichain, or a prime interval order. Next, we prove that every prime interval order with no infinite antichain is at most countable and does not embed a copy of the chain of rational numbers. Finally, for each countable ordinal α, we construct a well-quasi-ordered prime interval order Pα whose chain of maximal antichains has Hausdorff rank α.