A sharp lower bound for the canonical volume of 3-folds of general type
Abstract
Let V be a smooth projective 3-fold of general type. Denote by K3, a rational number, the self-intersection of the canonical sheaf of any minimal model of V. One defines K3 as the canonical volume of V. Assume pg 2. We show that K3 1/3, which is a sharp lower bound. Then we classify those V with small K3 up to explicit tructure. We also give some new examples with pg=2 which have maximal canonical stability index. Finally we give an application to certain algebraic 4-folds.
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