The structure of the automorphism group of a free group on two generators

Abstract:

Let ${F_2} = Z * Z$ be a free group of rank two. We show that ${\operatorname {Aut} F_2}$ can be built up from cyclic groups by using only the free products and semidirect products. Explicitly we have $\operatorname {Aut} {F_2} = ((Z * Z) \rtimes ({Z_3} * {Z_3})) \rtimes ({Z_4} \rtimes {Z_2})$. As a corollary we obtain a simple presentation of $\operatorname {Aut} {F_2}$.