On canonical bundle formula for fibrations of curves with arithmetic genus one
Abstract
In this paper, we develop canonical bundle formulas for fibrations of relative dimension one in characteristic p>0. For such a fibration from a log pair f (X, ) S, if f is separable, we can obtain a formula similar to the one due to Witaszek Wit21; if f is inseparable, we treat the case when S is of maximal Albanese dimension. As an application, we prove that for a klt pair (X,) with -(KX+) nef, if the Albanese morphism aX X A is of relative dimension one, then X is a fiber space over A.
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