Shelling of links and star clusters in edgewise subdivision of a simplex

Abstract

We show that the combinatorial types of the links of the vertices in the edgewise triangulation Tk,q of a (k-1)-simplex are encoded by the partitions of k. Each of these complexes is isomorphic to a subcomplex of the barycentric subdivision of the boundary of a (k-1)-simplex, and the containment relations among them are described by a new poset on the set of partitions of k. We compute the h-vectors of these complexes and determine the number of vertices of Tk,q whose links are the same (correspond to the same partition). The combinatorial type of the link of an (s-1)-dimensional face of Tk,q corresponds to a partition (λ1,λ2,…,λs) of k into s parts, together with additional partitions of each λi. We also enumerate the combinatorial types of all m-dimensional complexes that arise as the links in edgewise triangulations. A new permutation statistic, the faithful initial part, is introduced and used to describe the star cluster of a facet of Tk,q. By examining a specific shelling of this star cluster, we prove that the i-th entry of its h-vector counts the number of permutations of [k] with exactly i descents, taking into account the faithful initial part as the multiplicity. Finally, we describe a concrete shelling order for Tk,q, give a combinatorial interpretation of its h-vector, and derive an explicit formula for it.