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IITAKA $C_{n,m}$ CONJECTURE FOR 3-FOLDS OVER FINITE FIELDS

  • CAUCHER BIRKAR (a1), YIFEI CHEN (a2) and LEI ZHANG (a3)

Abstract

We prove Iitaka $C_{n,m}$ conjecture for $3$ -folds over the algebraic closure of finite fields. Along the way we prove some results on the birational geometry of log surfaces over nonclosed fields and apply these to existence of relative good minimal models of $3$ -folds.

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IITAKA $C_{n,m}$ CONJECTURE FOR 3-FOLDS OVER FINITE FIELDS

  • CAUCHER BIRKAR (a1), YIFEI CHEN (a2) and LEI ZHANG (a3)

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