Notes on periodic elements of Garside groups
Abstract
Let G be a Garside group with Garside element . An element g in G is said to be periodic if some power of g lies in the cyclic group generated by . This paper shows the following. (i) 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. (ii) If gk=ka for some nonzero integer k, then g is conjugate to a. (iii) Every finite subgroup of the quotient group G/<m> is cyclic, where m is the minimal positive central power of .
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