Abstract
A smooth scheme X over a field k of positive characteristic is said to be strongly liftable over W2(k), if X and all prime divisors on X can be lifted simultaneously over W2(k). In this paper, we first deduce the Kummer covering trick over W2(k), which can be used to construct a large class of smooth projective varieties liftable over W2(k), and to give a direct proof of the Kawamata–Viehweg vanishing theorem on strongly liftable schemes. Secondly, we generalize almost all of the results in [18,19] to the case where everything is considered over W(k), the ring of Witt vectors of k.
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