Pontrjagin duality on multiplicative gerbes

IF 0.7 2区 数学 Q2 MATHEMATICS Journal of Noncommutative Geometry Pub Date : 2023-09-28 DOI:10.4171/jncg/528
Jaider Blanco, Bernardo Uribe, Konrad Waldorf
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引用次数: 2

Abstract

We use Segal–Mitchison’s cohomology of topological groups to define a convenient model for topological gerbes. We introduce multiplicative gerbes over topological groups in this setup and define their representations. For a specific choice of representation, we construct its category of endomorphisms, and we show that it induces a new multiplicative gerbe over another topological group. This new induced group is fiberwise Pontrjagin dual of the original one, and therefore we called the pair of multiplicative gerbes “Pontrjagin dual”. We show that Pontrjagin dual multiplicative gerbes have equivalent categories of representations. In addition, we show that their monoidal centers are equivalent. Examples of Pontrjagin dual multiplicative gerbes over finite and discrete, as well as compact and non-compact, Lie groups are provided.
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乘法gerbe上的Pontrjagin对偶性
我们利用拓扑群的Segal-Mitchison上同调定义了一个方便的拓扑gerbes模型。在此设置中,我们在拓扑群上引入乘法gerbes,并定义它们的表示形式。对于一个特定的表示选择,我们构造了它的自同态范畴,并证明了它在另一个拓扑群上引出了一个新的乘法gerbe。这个新的诱导群是原诱导群的纤维状庞特加金对偶,因此我们称这对乘法gerbe为“庞特加金对偶”。我们证明了庞特加金对偶乘法布具有等价的表示范畴。此外,我们还证明了它们的单轴中心是等价的。给出了有限李群和离散李群以及紧李群和非紧李群上的Pontrjagin对偶乘法格布的例子。
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来源期刊
CiteScore
1.60
自引率
11.10%
发文量
30
审稿时长
>12 weeks
期刊介绍: The Journal of Noncommutative Geometry covers the noncommutative world in all its aspects. It is devoted to publication of research articles which represent major advances in the area of noncommutative geometry and its applications to other fields of mathematics and theoretical physics. Topics covered include in particular: Hochschild and cyclic cohomology K-theory and index theory Measure theory and topology of noncommutative spaces, operator algebras Spectral geometry of noncommutative spaces Noncommutative algebraic geometry Hopf algebras and quantum groups Foliations, groupoids, stacks, gerbes Deformations and quantization Noncommutative spaces in number theory and arithmetic geometry Noncommutative geometry in physics: QFT, renormalization, gauge theory, string theory, gravity, mirror symmetry, solid state physics, statistical mechanics.
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