Algebraic properties of the group of germs of diffeomorphisms

Abstract

We establish some algebraic properties of the group Diff(Cn,0) of germs of analytic diffeomorphisms of Cn, and its formal completion Diff(Cn,0). For instance we describe the commutator of Diff(Cn,0), but also prove that any finitely generated subgroup of Diff(Cn,0) is residually finite; we thus obtain some constraints of groups that embed into Diff(Cn,0). We show that Diff(Cn,0) is an Hopfian group, and that Diff(Cn,0) and Diff(Cn,0) are not co-Hopfian. We end by the description of the automorphisms groups of Diff(C,0), and Diff(C,0).