8 research outputs found
Ample Weil divisors
We define and study positivity (nefness, amplitude, bigness and
pseudo-effectiveness) for Weil divisors on normal projective varieties. We
prove various characterizations, vanishing and non-vanishing theorems for
cohomology, global generation statements, and a result related to log Fano.Comment: Version 3: published versio
Towards a non-Q-Gorenstein Minimal Model Program
Thesis (Ph.D.)--University of Washington, 2014In this thesis we do the first steps towards a non-Q-Gorenstein Minimal Model Program. We extensively study non-Q-factorial singularities, using the techniques introduced by [dFH09]. We introduce a new class of singularities, log terminal+, which we show satisfies several nice properties; we investigate the finite generation of the canonical algebra of local sections, we relate log terminal+ singularities with existing classes, we show a Bertini-type theorem, and small deformation invariance. We also provide a list of examples of the pathologies that can occur when working in the non-Q-factorial setting. We subsequently focus on defining and studying positivity for Weil divisors. We define nefness / amplitude / bigness / pseudo-effectivity for Weil divisors; we show various characterizations of this notions, and we prove vanishing and non-vanishing theorems. We conclude with a proposal of a non-Q-Gorenstein MMP, we prove it for toric varieties, and we discuss where the obstacles lay in the general case. As application of our techniques, we prove the existence on non-Q-factorial log terminal flips