Normalisation holomorphe d'alg\`ebres de type Cartan de champs de vecteurs holomorphes singuliers

Abstract

We consider a commutative family of holomorphic vector fields in an neighbourhood of a common singular point, say 0∈ Cn. Let g be a commutative complex Lie algebra of dimension l. Let λ1,...,λn∈ g* and let us set S(g)=Σi=1nλi(g)xi∂∂ xi. We assume that this Lie morphism is diophantine in the sense that a diophantine condition (ω(S)) is satisfied. Let X1 be a holomorphic vector field in a neighbourhood of 0∈ Cn. We assume that its linear part s is regular relatively to S, that is belongs to S( g) and has the same formal centralizer as S. Let X2,..., Xl be holomorphic vector fields vanishing at 0 and commuting with X1. Then there exists a formal diffeomorphism of ( Cn,0) such that the family of vector fields are in normal form in these formal coordinates. This means that each element of the family commutes with s. We show that, if the normal forms of the Xi's belongs to OnS S( g) ( OnS is the ring of formal first integrals of S) and their junior parts are free over OnS, then there exists a holomorphic diffeomorphism of ( Cn,0) which transforms the family into a normal form. The elements of the family, but one, may not have a non-zero linear part at the origin.

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