第 5 属中 Prym 特征基因位点的连通性

IF 0.5 4区数学 Q3 MATHEMATICS

Doklady Mathematics Pub Date : 2024-03-14 DOI:10.1134/S1064562423701429

M. Nenasheva

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引用次数: 0

摘要

属数为 g 的曲线上的全形微分模空间具有一个自然作用群 \(G{{L}_{2}}(\mathbb{R})\)。在过去几十年里，对这一作用的轨道及其闭包的研究引起了众多研究者的兴趣。2000 年代，麦克马伦（C. McMullen）描述了一个无穷的轨道家族，它们是属 2 曲线上的全形微分空间中此类轨道的闭包。在更高属曲线上的全形微分空间中，作为 \(G{{L}_{2}}(\mathbb{R})\)-orbit closures 的联合的轨道的著名例子是 Prym eigenform loci。对于至多 5 属的曲面，它们是非空的。本文首次提出了对最大可能属面的 Prym 特征形式位置中的连通成分数的非难计算。

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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Connectedness of Prym Eigenform Loci in Genus 5

The moduli space of holomorphic differentials on curves of genus g admits a natural action of the group \(G{{L}_{2}}(\mathbb{R})\). The study of orbits of this action and their closures has attracted the interest of a wide range of researchers in the last few decades. In the 2000s, C. McMullen described an infinite family of orbifolds that are closures of such orbits in the space of holomorphic differentials on curves of genus 2. In spaces of holomorphic differentials on curves of higher genera, well-known examples of orbifolds that are unions of \(G{{L}_{2}}(\mathbb{R})\)-orbit closures are Prym eigenform loci. They are nonempty for surfaces of genus at most 5. This paper presents the first nontrivial calculations of the number of connected components in Prym eigenform loci for surfaces of maximum possible genus.

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来源期刊

Doklady Mathematics 数学-数学

CiteScore

1.00

自引率

16.70%

发文量

审稿时长

3-6 weeks

期刊介绍： Doklady Mathematics is a journal of the Presidium of the Russian Academy of Sciences. It contains English translations of papers published in Doklady Akademii Nauk (Proceedings of the Russian Academy of Sciences), which was founded in 1933 and is published 36 times a year. Doklady Mathematics includes the materials from the following areas: mathematics, mathematical physics, computer science, control theory, and computers. It publishes brief scientific reports on previously unpublished significant new research in mathematics and its applications. The main contributors to the journal are Members of the RAS, Corresponding Members of the RAS, and scientists from the former Soviet Union and other foreign countries. Among the contributors are the outstanding Russian mathematicians.