Sign variation and descents

Abstract

For any n > 0 and 0 ≤ m < n, let Pn,m be the poset of projective equivalence classes of \-,0,+\-vectors of length n with sign variation bounded by m, ordered by reverse inclusion of the positions of zeros. Let n,m be the order complex of Pn,m. A previous result from the third author shows that n,m is Cohen-Macaulay over Q whenever m is even or m = n-1. Hence, it follows that the h-vector of n,m consists of nonnegative entries. Our main result states that n,m is partitionable and we give an interpretation of the h-vector when m is even or m = n-1. When m = n-1 the entries of the h-vector turn out to be the new Eulerian numbers of type D studied by Borowiec and M otkowski in [ Electron. J. Combin., 23(1):Paper 1.38, 13, 2016]. We then combine our main result with Klee's generalized Dehn-Sommerville relations to give a geometric proof of some facts about these Eulerian numbers of type D.