Une caract\'erisation diff\'erentielle des faisceaux analytiques coh\'erents sur une vari\'et\'e complexe

Abstract

We give a generalization, in the context of sheaves, of a classical result of Grothendieck concerning the integrability of connections of type (0,1) over a C∞ vector bundle over a complex manifold. We introduce the notion of ∂-coherent sheaf, which is a C∞ notion, and we prove the existence of an (exact) equivalence between the category of coherent analytic sheaves and the category of ∂-coherent sheaves. The principal difficulty of the proof is the solution of a quasi-linear differential equation with standard ∂ as its principal term. We are able to find a solution of this differential equation, using a rapidly convergent iteration scheme of Nash-Moser type.

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