Strict Arakelov inequality for a family of varieties of general type
Abstract
Let f:\, X Y be a semistable non-isotrivial family of n-folds over a smooth projective curve with discriminant locus S ⊂eq Y and with general fibre F of general type. We show the strict Arakelov inequality \[deg\, f*ωX/Yrank\, f*ωX/Y < n 2·deg\,1Y( S),\] for all ∈ N such that the -th pluricanonical linear system |ωF| is birational. This answers a question asked by M\"oller, Viehweg and the third named author.
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