Holomorphic foliations of degree two and arbitrary dimension
Abstract
We prove a complete classification of degree-2 foliations on Pn in any dimension, assuming they are not algebraically integrable. If F is such a foliation, then either F is the linear pull-back of a degree-2 foliation by curves on Pn-k+1, or a logarithmic foliation of type (1n-k+1,2), or a logarithmic foliation of type (1n-k+3), or the linear pull-back of a degree-2 foliation of dimension 2 on Pn-k+2 tangent to an action of the Lie algebra aff(C). Meanwhile, we prove that any 2-dimensional foliation tangent to a global vector field must satisfy that its tangent sheaf is either not locally free or has a direct summand isomorphic to OPn(a), with a∈\0,1\. As a byproduct of our classification, we describe the geometry of Poisson structures on P4 with generic rank two.
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