Tautological Intersection Numbers and Order-Consecutive Partition Sequences

Abstract

By recent work of Afandi, it is known that tautological intersection numbers on the moduli space of stable n-pointed genus g curves can be arranged into families of Ehrhart polynomials, \Ld\, for partial polytopal complexes. In particular, the f*-vector of Ld is known to be integral and non-negative. In this paper, we show that both the f*-vector and h*-vector have an enumerative interpretation in the special case that d = (1, 1, …, 1). The f*-vector counts order-consecutive partition sequences of [n+1] and the h*-vector is a binomial coefficient. Furthermore, we conjecture that, for all d, the f*-vector of Ld always forms a log-concave sequence, and we verify this conjecture in the case that d = (1, 1, …, 1).