Abstract

Let M be a connected taut complex manifold of dimension n such that the set H(M) of holomorphic functions on M separates points of M and let D be a bounded complete Reinhardt domain of holomorphy in Let f:M→D be a holomorphic mapping. Let p be a point of M. Assume that f(p)=0 and that df p is an isometry for the infinitesimal Kobayashi metric, in this case, we will show that f is a biholomorphic mapping

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