The extension of numerically trivial divisors on a family

Abstract

Let f:X S be a projective morphism of normal varieties. Assume U is an open subset of S and LU is a Q-divisor on XU:=X×S U such that LUU 0. We explore when it is possible to extend LU to a global Q-divisor L on X such that Lf 0. In particular, we show that such L always exists after a (weak) semi-stable reduction when S=1. On the other hand, we give an example showing that L may not exist (after any reasonable modification of f) if S 2, which also gives an fU-nef divisor MU that cannot extend to an f-nef (Q) divisor M for any compactification of f|U, even after replacing XU with any higher birational model.

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