Q-abelian and Q-Fano finite quotients of abelian varieties
Abstract
We study finite quotients of abelian varieties (fqav for short) i.e. quotients of abelian varieties by finite groups. We show that Q-abelian varieties (i.e. fqav's with Q-linearly trivial canonical divisors) are characterized by the existence of quasi\'etale polarized (or int-amplified) endomorphisms. We show that every fqav has a finite quasi\'etale cover by the product of an abelian variety and a Q-Fano fqav. Using such coverings, we give a characterization of Q-Fano fqav's, and show that Q-Fano fqav's and Q-abelian varieties are ``building blocks'' of general fqav's.
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