Representations of quasiprojective groups, Flat connections and Transversely projective foliations
Résumé
The main purpose of this paper is to provide a structure theorem for codimension one singular transversely projective foliations on projective manifolds. To reach our goal, we firstly extend Corlette-Simpson's classification of rank two representations of fundamental groups of quasiprojective manifolds by dropping the hypothesis of quasi-unipotency at infinity. Secondly we establish an analogue classification for rank 2 flat meromorphic connections. In particular, we prove that a rank 2 flat meromorphic connection with irregular singularities having non trivial Stokes projectively factors through a connection over a curve.
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