Abstract :
Let Fn be a free group with rank n, and denote by Out Fn its outer automorphism group. For arbitrary n, consider the orders of periodic elements in Out Fn or, equivalently, the orders of finite cyclic subgroups of Out Fn. By considering group actions on finite connected graphs, we obtained the number-theoretical characterization of these orders. Comparing the results with those for cyclic subgroups of finite symmetric groups asymptotic estimation for the maximum order cn is derived.
