The conjugacy stability problem for parabolic subgroups in Artin groups

Abstract

Given an Artin group A and a parabolic subgroup P, we study if every two elements of P that are conjugate in A, are also conjugate in P. We provide an algorithm to solve this decision problem if A satisfies three properties that are conjectured to be true for every Artin group. We partially solve the problem if A has FC-type, and we totally solve it if A is isomorphic to a free product of spherical Artin groups. In particular, we show that in this latter case, every element of A is contained in a unique minimal (by inclusion) parabolic subgroup.