Distances invariantes et points fixes d'applications holomorphes
Abstract
In this paper, we prove the following result : let X be a complex manifold, hyperbolic for the Carath\'eodory distance and let U be an open set relatively compact in X. Then, there exists k<1 such that we get, for the Carath\'eodory infinitesimal metric EX(x,v) less or equal to kEU(x,v). We also get results concerning fixed points of holomorphic mappings from X to U.
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