Spherical varieties with the $A_k$-property

Giuliano Gagliardi

arXiv:1303.5611·math.AG·November 13, 2017

Spherical varieties with the $A_k$-property

Giuliano Gagliardi

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TL;DR

This paper investigates the $A_k$-property in algebraic varieties, providing a combinatorial criterion for spherical varieties, which generalize toric varieties, using bunched rings and Luna-Vust theory.

Contribution

It introduces a new combinatorial criterion for the $A_k$-property in spherical varieties, extending the understanding of their embedding properties.

Findings

01

Provides a criterion for the $A_k$-property in spherical varieties.

02

Connects bunched rings with Luna-Vust theory for spherical embeddings.

03

Shows that spherical varieties generally do not have the $A_2$-property.

Abstract

An algebraic variety is said to have the $A_{k}$ -property if any $k$ points are contained in some common affine open neighbourhood. A theorem of W{\l}odarczyk states that a normal variety has the $A_{2}$ -property if and only if it admits a closed embedding into a toric variety. Spherical varieties can be regarded as a generalization of toric varieties, but they do not have the $A_{2}$ -property in general. We provide a combinatorial criterion for the $A_{k}$ -property of spherical varieties by combining the theory of bunched rings with the Luna-Vust theory of spherical embeddings.

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