p-chaoticity and regular action of abelian C1-diffeomorphisms groups of Cn fixing a point

Abstract

In this paper, we introduce the notion of regular action of any abelian subgroup G of $Diff1(Cn) on Cn (i.e. the closure of every orbit of G in some open set is a topological sub-manifold of Cn). We prove that if G fixes 0 and dim(vect(LG) =n, then the action of G, can not be p-chaotic for every 0<= p <=n-1. (i.e. If G has a dense orbit then the set of all regular orbit with order p can not be dense in Cn), where vect(LG) is the vector space generated by all Df0, f in G. Moreover, weprove that the action of any abelian lie subgroup of Diff1(Cn), is regular.