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2015 Effective Matsusaka's theorem for surfaces in characteristic $p$
Gabriele Di Cerbo, Andrea Fanelli
Algebra Number Theory 9(6): 1453-1475 (2015). DOI: 10.2140/ant.2015.9.1453

Abstract

We obtain an effective version of Matsusaka’s theorem for arbitrary smooth algebraic surfaces in positive characteristic, which provides an effective bound on the multiple that makes an ample line bundle D very ample. The proof for pathological surfaces is based on a Reider-type theorem. As a consequence, a Kawamata–Viehweg-type vanishing theorem is proved for arbitrary smooth algebraic surfaces in positive characteristic.

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Gabriele Di Cerbo. Andrea Fanelli. "Effective Matsusaka's theorem for surfaces in characteristic $p$." Algebra Number Theory 9 (6) 1453 - 1475, 2015. https://doi.org/10.2140/ant.2015.9.1453

Information

Received: 24 February 2015; Revised: 16 April 2015; Accepted: 17 May 2015; Published: 2015
First available in Project Euclid: 16 November 2017

zbMATH: 06488168
MathSciNet: MR3397408
Digital Object Identifier: 10.2140/ant.2015.9.1453

Subjects:
Primary: 14J25

Keywords: bend-and-break , Bogomolov's stability , effective Kawamata–Viehweg vanishing , effective Matsusaka , Fujita's conjectures , Reider's theorem , surfaces in positive characteristic

Rights: Copyright © 2015 Mathematical Sciences Publishers

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