Abstract
We prove holomorphic immersion theorems in a finite dimensional complex projective space for kahlerian non-compact manifolds and for laminations by complex manifolds that carry a line bundle of positive curvature. In particular, we prove that on a Riemann surfaces lamination of a compact space, the space of meromorphic functions separates points if and only if every foliation cycle is non homologous to 0.
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Schedule a callMore From: Journal of The Institute of Mathematics of Jussieu
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