Connecting descent and peak polynomials

Abstract

A permutation σ=σ1 σ2 ·s σn has a descent at i if σi>σi+1. A descent i is called a peak if i>1 and i-1 is not a descent. The size of the set of all permutations of n with a given descent set is a polynomials in n, called the polynomial. Similarly, the size of the set of all permutations of n with a given peak set, adjusted by a power of 2 gives a polynomial in n, called the peak polynomial. In this work we give a unitary expansion of descent polynomials in terms of peak polynomials. Then we use this expansion to give a combinatorial interpretation of the coefficients of the peak polynomial in a binomial basis, thus giving a new proof of the peak polynomial positivity conjecture.