Log-concavity of the Excedance Enumerators in positive elements of Type A and Type B Coxeter Groups

Abstract

The classical Eulerian Numbers An,k are known to be log-concave. Let Pn,k and Qn,k be the number of even and odd permutations with k excedances. In this paper, we show that Pn,k and Qn,k are log-concave. For this, we introduce the notion of strong synchronisation and ratio-alternating which are motivated by the notion of synchronisation and ratio-dominance, introduced by Gross, Mansour, Tucker and Wang in 2014. We show similar results for Type B Coxeter Groups. We finish with some conjectures to emphasize the following: though strong synchronisation is stronger than log-concavity, many pairs of interesting combinatorial families of sequences seem to satisfy this property.