Proof of a conjecture of Matherne, Morales, and Selover on encodings of unit interval orders

Abstract

There are two bijections from unit interval orders on n elements to Dyck paths from (0,0) to (n,n). One is to consider the pairs of incomparable elements, which form the set of boxes between some Dyck path and the diagonal. Another is to find a particular part listing (in the sense of Guay-Paquet) which yields an isomorphic poset, and to interpret the part listing as the area sequence of a Dyck path. Matherne, Morales, and Selover conjectured that, for any unit interval order, these two Dyck paths are related by Haglund's well-known zeta bijection. In this paper we prove their conjecture.

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