Global generation and very ampleness for adjoint linear series

Abstract

Let X be a smooth projective variety over an algebraically closed field K with arbitrary characteristic. Suppose L is an ample and globally generated line bundle. By Castelnuovo--Mumford regularity, we show that KX L X A is globally generated and KX L ( X+1) A is very ample, provided the line bundle A is nef but not numerically trivial. On complex projective varieties, by investigating Kawamata-Viehweg-Nadel type vanishing theorems for vector bundles, we also obtain the global generation for adjoint vector bundles. In particular, for a holomorphic submersion f:X Y with L ample and globally generated, and A nef but not numerically trivial, we prove the global generation of f*(KX/Y) s KY L Y A for any positive integer s.