Parabolic subgroups acting on the additional length graph

Abstract

Let A≠ A1, A2, I2m be an irreducible Artin--Tits group of spherical type. We show that periodic elements of A and the elements preserving some parabolic subgroup of A act elliptically on the additional length graph CAL(A), an hyperbolic, infinite diameter graph associated to A constructed by Calvez and Wiest to show that A/Z(A) is acylindrically hyperbolic. We use these results to find an element g∈ A such that P,g P* g for every proper standard parabolic subgroup P of A. The length of g is uniformly bounded with respect to the Garside generators, independently of A. This allows us to show that, in contrast with the Artin generators case, the sequence \ω(An,S)\n∈ N of exponential growth rates of braid groups with respect to the Garside generating set, goes to infinity.