Fiber integration of gerbes and Deligne line bundles

IF 0.8 4区 数学 Q2 MATHEMATICS
E. Aldrovandi, N. Ramachandran
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引用次数: 1

Abstract

Let $\pi: X \to S$ be a family of smooth projective curves, and let $L$ and $M$ be a pair of line bundles on $X$. We show that Deligne's line bundle $\langle{L,M}\rangle$ can be obtained from the $\mathcal{K}_2$-gerbe $G_{L,M}$ constructed in a previous work by the authors via an integration along the fiber map for gerbes that categorifies the well known one arising from the Leray spectral sequence of $\pi$. Our construction provides a full account of the biadditivity properties of $\langle {L,M}\rangle$. The functorial description of the low degree maps in the Leray spectral sequence for $\pi$ we develop are of independent interest, and along the course we provide an example of their application to the Brauer group.
光纤集成gerbes和Deligne线束
设$\pi: X \到S$是光滑的投影曲线族,设$L$和$M$是$X$上的一对线束。我们证明了Deligne线束$\langle{L,M}\rangle$可以由作者在以前的工作中构造的$\mathcal{K}_2$-gerbe $G_{L,M}$得到,这是通过对由$\pi$的Leray谱序列产生的著名的gerbes纤维映射进行积分得到的。我们的构造充分说明了$\ rangle {L,M}\rangle$的双可加性。我们开发的$\pi$的Leray谱序列中的低次映射的泛函描述具有独立的兴趣,并在课程中提供了它们在Brauer群中的应用示例。
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来源期刊
CiteScore
1.10
自引率
0.00%
发文量
37
审稿时长
>12 weeks
期刊介绍: Homology, Homotopy and Applications is a refereed journal which publishes high-quality papers in the general area of homotopy theory and algebraic topology, as well as applications of the ideas and results in this area. This means applications in the broadest possible sense, i.e. applications to other parts of mathematics such as number theory and algebraic geometry, as well as to areas outside of mathematics, such as computer science, physics, and statistics. Homotopy theory is also intended to be interpreted broadly, including algebraic K-theory, model categories, homotopy theory of varieties, etc. We particularly encourage innovative papers which point the way toward new applications of the subject.
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