Stability of branched pull-back projective foliations
Abstract
We prove that, if n≥ 3, a singular foliation F on Pn which can be written as pull-back, where G is a foliation in P2 of degree d≥2 with one or three invariant lines in general position and f: Pn---> P2, deg(f)=≥2, is an appropriated rational map, is stable under holomorphic deformations. As a consequence we conclude that the closure of the sets \ F= f*(G)\ are new irreducible components of the space of holomorphic foliations of certain degrees.
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