Almost nef regular foliations and Fujita's decomposition of reflexive sheaves

Abstract

In this paper, we study almost nef regular foliations. We give a structure theorem of a smooth projective variety X with an almost nef regular foliation F: X admits a smooth morphism f: X → Y with rationally connected fibers such that F is a pullback of a numerically flat regular foliation on Y. Moreover, f is characterized as a relative MRC fibration of an algebraic part of F. As a corollary, an almost nef tangent bundle of a rationally connected variety is generically ample. For the proof, we generalize Fujita's decomposition theorem. As a by-product, we show that a reflexive hull of f*(mKX/Y) is a direct sum of a hermitian flat vector bundle and a generically ample reflexive sheaf for any algebraic fiber space f : X → Y. We also study foliations with nef anti-canonical bundles.