投影流形上厄密杨-米尔斯连接模空间的复代数紧化

IF 2 1区 数学 Geometry & Topology Pub Date : 2018-09-28 DOI:10.2140/gt.2021.25.1719
D. Greb, Benjamin Sibley, M. Toma, R. Wentworth
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引用次数: 12

摘要

本文研究了任意维射影代数流形上固定厄米特向量束上赫尔米特-杨-米尔斯连接模空间的三个紧化关系。通过Donaldson-Uhlenbeck-Yau定理,该空间与稳定全纯向量束的模空间解析同构,因此它允许Gieseker-Maruyama半稳定无扭束的代数紧化。由于第一和第三作者最近的一个构造给出了另一个紧化作为斜坡半稳定轮的模空间。本文在Tian对复二维Uhlenbeck和Donaldson的分析进行推广的基础上,通过在边界处添加某些理想连接来定义规范论紧化。推广李军在代数曲面上束的情况下的工作,给出了束理论紧化的比较映射,并证明了它们的连续性。这种连续性,加上对斜坡半稳定轮轴模空间中映射纤维的精细分析,使我们能够赋予规范理论紧化以复解析空间的结构。
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Complex algebraic compactifications of the moduli space of Hermitian Yang–Mills connections on a projective manifold
In this paper we study the relationship between three compactifications of the moduli space of Hermitian-Yang-Mills connections on a fixed Hermitian vector bundle over a projective algebraic manifold of arbitrary dimension. Via the Donaldson-Uhlenbeck-Yau theorem, this space is analytically isomorphic to the moduli space of stable holomorphic vector bundles, and as such it admits an algebraic compactification by Gieseker-Maruyama semistable torsion-free sheaves. A recent construction due to the first and third authors gives another compactification as a moduli space of slope semistable sheaves. In the present article, following fundamental work of Tian generalising the analysis of Uhlenbeck and Donaldson in complex dimension two, we define a gauge theoretic compactification by adding certain ideal connections at the boundary. Extending work of Jun Li in the case of bundles on algebraic surfaces, we exhibit comparison maps from the sheaf theoretic compactifications and prove their continuity. The continuity, together with a delicate analysis of the fibres of the map from the moduli space of slope semistable sheaves allows us to endow the gauge theoretic compactification with the structure of a complex analytic space.
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来源期刊
Geometry & Topology
Geometry & Topology 数学-数学
自引率
5.00%
发文量
34
期刊介绍: Geometry and Topology is a fully refereed journal covering all of geometry and topology, broadly understood. G&T is published in electronic and print formats by Mathematical Sciences Publishers. The purpose of Geometry & Topology is the advancement of mathematics. Editors evaluate submitted papers strictly on the basis of scientific merit, without regard to authors" nationality, country of residence, institutional affiliation, sex, ethnic origin, or political views.
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