Generating functions and triangulations for lecture hall cones

Abstract

We investigate the arithmetic-geometric structure of the lecture hall cone \[ Ln \ := \ \λ∈ Rn: \, 0≤ λ11≤ λ22≤ λ33≤ ·s ≤ λnn\ . \] We show that Ln is isomorphic to the cone over the lattice pyramid of a reflexive simplex whose Ehrhart h*-polynomial is given by the (n-1)st Eulerian polynomial, and prove that lecture hall cones admit regular, flag, unimodular triangulations. After explicitly describing the Hilbert basis for Ln, we conclude with observations and a conjecture regarding the structure of unimodular triangulations of Ln, including connections between enumerative and algebraic properties of Ln and cones over unit cubes.