Rank one foliations on toroidal varieties
Abstract
Consider a log canonical pair (X,B) such that there is a Cartier divisor D for which TX(- B) O(D) is locally free and globally generated. Let F be a log canonical foliation of rank 1 on X. We prove that there exists a divisor such that (X, ) is log canonical and KX + K F + D. We then apply this result to prove several statements on the birational geometry of rank 1 log canonical foliations on log homogeneous varieties.
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