Une note \`a propos du Jacobien de n fonctions holomorphes \`a l'origine de Cn

Abstract

Let f1,...,fn be n germs of holomorphic functions at the origin of Cn such that fi(0)=0, 1≤ i≤ n. We give a proof based on the J. Lipman's theory of residues via Hochschild Homology that the Jacobian of f1,...,fn belongs to the ideal generated by f1,...,fn belongs to the ideal generated by f1,...,fn if and only if the dimension ot the germ of common zeos of f1,...,fn is sttrictly positive. In fact we prove much more general results which are relatives versions of this result replacing the field C by convenient noetherian rings A (c.f. Th. 3.1 and Th. 3.3). We then show a ojasiewicz inequality for the jacobian analogous to the classical one by S. ojasiewicz for the gradient.