法诺变体族的遍历性

arXiv - MATH - Algebraic Geometry Pub Date : 2024-09-05 DOI:arxiv-2409.03564

Lena Ji, Joaquín Moraga

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摘要

理性不是族中可构造的属性。在本文中，我们将考虑更强的合理性概念，并研究它们在法诺变项族中的行为。我们首先证明，在法诺变项族中，环性是一个可构造的性质。本文的第二个主要结果涉及介于环状变项和有理变项之间的一个中间概念，即簇型变项。簇型 $\mathbb Q$ 因式法诺变式包含一个开放的致密代数环，但该变式不需要具有环作用。我们证明，在$\mathbbQ$因子末端法诺变的家族中，簇类型是一个可构造的条件。因此，我们证明了有有限多个光滑族可以参数化 $n$ 维光滑簇型法诺变项。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Toricity in families of Fano varieties

Rationality is not a constructible property in families. In this article, we consider stronger notions of rationality and study their behavior in families of Fano varieties. We first show that being toric is a constructible property in families of Fano varieties. The second main result of this article concerns an intermediate notion that lies between toric and rational varieties, namely cluster type varieties. A cluster type $\mathbb Q$-factorial Fano variety contains an open dense algebraic torus, but the variety does not need to be endowed with a torus action. We prove that, in families of $\mathbb Q$-factorial terminal Fano varieties, being of cluster type is a constructible condition. As a consequence, we show that there are finitely many smooth families parametrizing $n$-dimensional smooth cluster type Fano varieties.

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arXiv - MATH - Algebraic Geometry

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