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Periodic elements in Garside groups

Let $G$ be a Garside group with Garside element $Δ$, and let $Δ^m$ be the minimal positive central power of $Δ$. An element $g\in G$ is said to be &#39;periodic&#39; if some power of it is a power of $Δ$. In this paper, we study periodic elements in Garside groups and their conjugacy classes. We show that the periodicity of an element does not depend on the choice of a particular Garside structure if and only if the center of $G$ is cyclic; if $g^k=Δ^{ka}$ for some nonzero integer $k$, then $g$ is conjugate to $Δ^a$; every finite subgroup of the quotient group $G/<Δ^m>$ is cyclic. By a classical theorem of Brouwer, Kerékjártó and Eilenberg, an $n$-braid is periodic if and only if it is conjugate to a power of one of two specific roots of $Δ^2$. We generalize this to Garside groups by showing that every periodic element is conjugate to a power of a root of $Δ^m$. We introduce the notions of slimness and precentrality for periodic elements, and show that the super summit set of a slim, precentral periodic element is closed under any partial cycling. For the conjugacy problem, we may assume the slimness without loss of generality. For the Artin groups of type $A_n$, $B_n$, $D_n$, $I_2(e)$ and the braid group of the complex reflection group of type $(e,e,n)$, endowed with the dual Garside structure, we may further assume the precentrality.