Integrability of vector fields and meromorphic solutions
Abstract
Let F be a foliation defined on a complex projective manifold M of dimension n and admitting a holomorphic vector field X tangent to it along some non-empty Zariski-open set. In this paper we prove that if X has sufficiently many integral curves that are given by meromorphic functions defined on C then the restriction of F to any invariant complex 2-dimensional analytic set admits a first integral of Liouvillean type. In particular, on C3, every rational vector fields whose solutions are meromorphic functions defined on C admits a non-empty invariant analytic set of dimension 2 where the restriction of the vector field yields a Liouvillean integrable foliation.
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