Poset ideals of P-partitions and generalized letterplace and determinantal ideals

Abstract

For any finite poset P we have the poset of isotone maps Hom(P,N), also called Pop-partitions. To any poset ideal J in Hom(P,N), finite or infinite, we associate monomial ideals: the letterplace ideal L( J,P) and the Alexander dual co-letterplace ideal L(P, J), and study them. We derive a class of monomial ideals in k[xp, p ∈ P] called P-stable. When P is a chain we establish a duality on strongly stable ideals. We study the case when J is a principal poset ideal. When P is a chain we construct a new class of determinantal ideals which generalizes ideals of maximal minors and whose initial ideals are letterplace ideals of prinicpal poset ideals.