Dyck path triangulations and extendability

Abstract

We introduce the Dyck path triangulation of the cartesian product of two simplices n-1×n-1. The maximal simplices of this triangulation are given by Dyck paths, and its construction naturally generalizes to produce triangulations of r\ n-1×n-1 using rational Dyck paths. Our study of the Dyck path triangulation is motivated by extendability problems of partial triangulations of products of two simplices. We show that whenever m≥ k>n, any triangulation of m-1(k-1)×n-1 extends to a unique triangulation of m-1×n-1. Moreover, with an explicit construction, we prove that the bound k>n is optimal. We also exhibit interesting interpretations of our results in the language of tropical oriented matroids, which are analogous to classical results in oriented matroid theory.