On canonically polarized Gorenstein 3-folds satisfying the Noether   equality

Yifan Chen; Yong Hu

arXiv:1411.2200·math.AG·July 3, 2018·1 cites

On canonically polarized Gorenstein 3-folds satisfying the Noether equality

Yifan Chen, Yong Hu

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TL;DR

This paper classifies and constructs examples of canonically polarized Gorenstein 3-folds with specific numerical properties, extending previous work and providing a detailed understanding of their structure and canonical maps.

Contribution

It characterizes the canonical maps, describes a structure theorem for locally factorial cases, and classifies smooth examples of such 3-folds with the given properties.

Findings

01

Complete classification of smooth examples.

02

Structure theorem for locally factorial 3-folds.

03

New constructed examples extending Kobayashi's work.

Abstract

We study canonically polarized Gorenstein $3$ -folds with at most terminal singularities and satisfying $K_{X}^{3} = \frac{4}{3} p_{g} (X) - \frac{10}{3}$ and $p_{g} (X) \geq 7$ . We characterize the canonical maps of such $3$ -folds, describe a structure theorem for the locally factorial ones and completely classify the smooth ones. New examples of canonically polarized smooth $3$ -folds with $K_{X}^{3} = \frac{4}{3} p_{g} (X) - \frac{10}{3}$ and $p_{g} (X) \geq 7$ are constructed. These examples are natural extensions of those constructed by M.~Kobayashi.

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Taxonomy

TopicsAlgebraic Geometry and Number Theory · Advanced Algebra and Geometry · Geometry and complex manifolds