The number of permutations with k inversions

Abstract

Let n≥ 1, 0≤ t≤ n 2 be arbitrary integers. Define the numbers In(t) as the number of permutations of [n] with t inversions. Let n,d≥ 1 and 0≤ t≤ (d-1)n be arbitrary integers. Define the polynomial coefficients H(n,d,t) as the numbers of compositions of t with at most n parts, no one of which is greater than d-1. In our article we give explicit formulas for the numbers In(t) and H(n,d,t) using the theory of Gr\"obner bases and free resolutions.