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On montre ici que l’invariant de Godbillon-Vey, défini pour les feuilletages de classe et de codimension 1, est un invariant de -conjugaison.
It is shown that a sub-analytic set has a density at each point, and the notion of pure cone is defined. As in the complex case, this density may be expressed in terms of the area of the connected components of the pure tangent cone, with involved integral multiplicities.
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