Abstract
We introduce the notion of Galois holomorphic foliation on the complex projective space as that of foliations whose Gauss map is a Galois covering when restricted to an appropriate Zariski open subset. First, we establish general criteria assuring that a rational map between projective manifolds of the same dimension defines a Galois covering. Then, these criteria are used to give a geometric characterization of Galois foliations in terms of their inflection divisor and their singularities. We also characterize Galois foliations on P2 admitting continuous symmetries, obtaining a complete classification of Galois homogeneous foliations.
Original language | English |
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Pages (from-to) | 3768-3827 |
Number of pages | 60 |
Journal | International Mathematics Research Notices |
Volume | 2016 |
Issue number | 12 |
DOIs | |
State | Published - 2016 |