Remarks on Ein-Lazarsfeld criterion of spannedness of adjoint bundles of polarized threefolds

Abstract

Let B be a nef and big line bundle on a smooth complex threefold X with canonical bundle K. Let x be a point on X and suppose that BC3 for any curve C passing x, B2S7 for any surface S containing x, and B351. Then K+B is spanned at x. (Ein-Lazarsfeld proved the assertion assuming B392.) Corollary: K+3L is spanned if L is an ample line bundle with L3>1.

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