A partial compactification of the Bridgeland stability manifold

IF 0.5 4区 数学 Q3 MATHEMATICS
Barbara Bolognese
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引用次数: 0

Abstract

Abstract Bridgeland stability manifolds of Calabi–Yau categories are of noticeable interest both in mathematics and physics. By looking at some of the known examples, a pattern clearly emerges and gives a fairly precise description of how they look like. In particular, they all seem to have missing loci, which tend to correspond to degenerate stability conditions vanishing on spherical objects. Describing such missing strata is also interesting from a mirror-symmetric perspective, as they conjecturally parametrize interesting types of degenerations of complex structures. All the naive attempts at constructing modular partial compactifications show how elusive and subtle the problem in fact is: ideally, the missing strata would correspond to stability manifolds of quotient triangulated categories, but establishing such a correspondence on the geometric level and viewing stability conditions on quotients of the original triangulated category as suitable degenerations of stability conditions is not straightforward. In this paper, we will present a method to construct such partial compactifications if some additional hypotheses are satisfied, by realizing our space of interest as a suitable metric completion of the stability manifold.
布里奇兰稳定流形的部分紧化
Calabi-Yau范畴的桥地稳定性流形在数学和物理学中都引起了人们的极大兴趣。通过观察一些已知的例子,一种模式清晰地浮现出来,并对它们的样子给出了相当精确的描述。特别是,它们似乎都有缺失的位点,这往往对应于在球形物体上消失的简并稳定性条件。从镜像对称的角度描述这些缺失的地层也很有趣,因为它们推测了复杂结构的有趣退化类型。所有构建模部分紧化的天真尝试都表明,这个问题实际上是多么难以理解和微妙:理想情况下,缺失的层将对应于商三角化范畴的稳定流形,但在几何水平上建立这样的对应关系,并将原始三角化范畴的商的稳定条件视为稳定条件的合适退化,这并不简单。在本文中,我们将通过将我们感兴趣的空间实现为稳定性流形的一个合适的度量补全,给出一种在满足一些附加假设的情况下构造这种部分紧化的方法。
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来源期刊
Advances in Geometry
Advances in Geometry 数学-数学
CiteScore
1.00
自引率
0.00%
发文量
31
审稿时长
>12 weeks
期刊介绍: Advances in Geometry is a mathematical journal for the publication of original research articles of excellent quality in the area of geometry. Geometry is a field of long standing-tradition and eminent importance. The study of space and spatial patterns is a major mathematical activity; geometric ideas and geometric language permeate all of mathematics.
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