Sur une conjecture de Dehornoy

Abstract

Let Mn be the n! * n! matrix indexed by permutations of Sn, defined by Mn(sigma,tau)=1 if every descent of tau-1 is also a descent of sigma, and Mn(sigma,tau)=0 otherwise. We prove the following result, conjectured by P. Dehornoy: the characteristic polynomial Pn(x)=|xI-Mn| of Mn divides Pn+1(x) in Z[x].