On the Albanese morphism of varieties with Frobenius stable Kodaira dimension zero
Abstract
We show that in positive characteristic, the Albanese morphism of normal proper varieties X with S(X, ωX) = 0 is separable, surjective, has connected fibers, and the generic fiber F also satisfies (F, ωF) = 0. As a corollary, we deduce a new case of Iitaka's subadditivity conjecture for fibrations over abelian varieties, when the generic fiber has non-nilpotent Hasse-Witt matrix.
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