A lifting principle for canonical stability indices of varieties of general type

Abstract

For any integer n>0, the nth canonical stability index rn is defined to be the smallest positive integer so that the rn-canonical map rn is stably birational onto its image for all smooth projective n-folds of general type. We prove the lifting principle for \rn\ as follows: rn equals to the maximum of the set of those canonical stability indices of smooth projective (n+1)-folds with sufficiently large canonical volumes. Equivalently, there exists a constant V(n)>0 such that, for any smooth projective n-fold X with the canonical volume vol(X)> V(n), the pluricanonical map m,X is birational onto the image for all m≥ rn-1. The ''lifting principle'' was first put forward by James McKernan in Mathematics Review (MR2339333).

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