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Main Authors: Chen, Meng, Jiang, Chen, Li, Binru
Format: Preprint
Published: 2020
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Online Access:https://arxiv.org/abs/2005.09828
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author Chen, Meng
Jiang, Chen
Li, Binru
author_facet Chen, Meng
Jiang, Chen
Li, Binru
contents This paper concerns the construction of minimal varieties with small canonical volumes. The first part devotes to establishing an effective nefness criterion for the canonical divisor of a weighted blow-up over a weighted hypersurface, from which we construct plenty of new minimal $3$-folds including $59$ families of minimal $3$-folds of general type, several infinite series of minimal $3$-folds of Kodaira dimension $2$, $2$ families of minimal $3$-folds of general type on the Noether line, and $12$ families of minimal $3$-folds of general type near the Noether line. In the second part, we prove effective lower bounds of canonical volumes of minimal $n$-folds of general type with canonical dimension $n-1$ or $n-2$. Examples are provided to show that the theoretical lower bounds are optimal in dimension less than or equal to $5$ and nearly optimal in higher dimensions.
format Preprint
id arxiv_https___arxiv_org_abs_2005_09828
institution arXiv
publishDate 2020
record_format arxiv
spellingShingle On minimal varieties growing from quasismooth weighted hypersurfaces
Chen, Meng
Jiang, Chen
Li, Binru
Algebraic Geometry
This paper concerns the construction of minimal varieties with small canonical volumes. The first part devotes to establishing an effective nefness criterion for the canonical divisor of a weighted blow-up over a weighted hypersurface, from which we construct plenty of new minimal $3$-folds including $59$ families of minimal $3$-folds of general type, several infinite series of minimal $3$-folds of Kodaira dimension $2$, $2$ families of minimal $3$-folds of general type on the Noether line, and $12$ families of minimal $3$-folds of general type near the Noether line. In the second part, we prove effective lower bounds of canonical volumes of minimal $n$-folds of general type with canonical dimension $n-1$ or $n-2$. Examples are provided to show that the theoretical lower bounds are optimal in dimension less than or equal to $5$ and nearly optimal in higher dimensions.
title On minimal varieties growing from quasismooth weighted hypersurfaces
topic Algebraic Geometry
url https://arxiv.org/abs/2005.09828