arXiv:2502.01370 Abstract | arXiv Analytics

arXiv:2502.01370 [math.AG]Abstract References Reviews Resources

The number of smooth varieties in an MMP on a 3-fold of Fano type

Published 2025-02-03, updated 2025-02-04Version 2

In this paper, we prove that for a threefold of Fano type $X$ and a movable $\mathbb{Q}$-Cartier Weil divisor $D$ on $X$, the number of smooth varieties that arise during the running of a $D$-MMP is bounded by $1 + h^1(X, 2D)$. Additionally, we prove a partial converse to the Kodaira vanishing theorem for a movable divisor on a threefold of Fano type.

Comments: Comments welcome

Categories: math.AG

Subjects: 14E30, 14F17

Keywords: fano type, smooth varieties, cartier weil divisor, partial converse, kodaira vanishing theorem

Related articles: Most relevant | Search more

arXiv:1501.00741 [math.AG] (Published 2015-01-05)

Kodaira vanishing theorem for log-canonical and semi-log-canonical pairs

Osamu Fujino

arXiv:2002.00679 [math.AG] (Published 2020-02-03)

On the Kodaira vanishing theorem for log del Pezzo surfaces in positive characteristic

Emelie Arvidsson

arXiv:1506.04900 [math.AG] (Published 2015-06-16)

Surfaces of globally $F$-regular type are of Fano type

Shinnosuke Okawa

arXiv Analytics

arXiv:2502.01370 [math.AG]Abstract References Reviews Resources

The number of smooth varieties in an MMP on a 3-fold of Fano type

Links

Toolbox

arXiv:2502.01370 [math.AG]AbstractReferencesReviewsResources

The number of smooth varieties in an MMP on a 3-fold of Fano type

Links

Toolbox

arXiv:2502.01370 [math.AG]Abstract References Reviews Resources