Takumi Murayama
Published 2019-05-09Version 1
In 1988, Fujita conjectured that there is an effective and uniform way to turn an ample line bundle on a smooth projective variety into a globally generated or very ample line bundle. We study Fujita's conjecture using Seshadri constants, which were first introduced by Demailly in 1992 with the hope that they could be used to prove cases of Fujita's conjecture. While examples of Miranda seemed to indicate that Seshadri constants could not be used to prove Fujita's conjecture, we present a new approach to Fujita's conjecture using Seshadri constants and positive characteristic methods. Our technique recovers some known results toward Fujita's conjecture over the complex numbers, without the use of vanishing theorems, and proves new results for complex varieties with singularities. Instead of vanishing theorems, we use positive characteristic techniques related to the Frobenius-Seshadri constants introduced by Musta\c{t}\u{a}-Schwede and the author. As an application of our results, we give a characterization of projective space using Seshadri constants in positive characteristic, which was proved in characteristic zero by Bauer and Szemberg.
Comments: 206 pages, 12 figures, 4 tables. PhD thesis, University of Michigan, May 2019. Includes material from arXiv:1701.00511 and arXiv:1809.01217
Syzygies and equations of Kummer varieties
Adjunction for varieties with $\mathbb{C}^*$ action
Rationality of Seshadri constants on general blow ups of $\mathbb{P}^2$
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