Frobenius liftable hypersurfaces
Abstract
Let D be a reduced divisor in Pnk for an algebraically closed field k of positive characteristic p > 0. We prove that if ( Pnk, D) is Frobenius liftable modulo p2, then D is a toric divisor. As a corollary, we show that if there exists a finite surjective morphism f Y X onto a smooth projective complex variety X of Picard rank 1 such that (Y, f-1(D)red) is a toric pair, then X is the projective space and D is a toric divisor.
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