The additivity of traces in monoidal derivators

Groth Moritz; Ponto Kate; Shulman Michael

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The additivity of traces in monoidal derivators

机译：单曲面导数中痕量的可加性

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摘要

Motivated by traces of matrices and Euler characteristics of topological spaces, we expect abstract traces in a symmetric monoidal category to be "additive". When the category is "stable" in some sense, additivity along cofiber sequences is a question about the interaction of stability and the monoidal structure.

机译：受矩阵的痕迹和拓扑空间的欧拉特征的影响，我们期望对称单项类别中的抽象痕迹是“加和的”。当类别在某种意义上是“稳定的”时，沿着纤维序列的可加性是关于稳定性和单曲面结构相互作用的问题。

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来源
《Journal of K-Theory》 |2014年第3期|共73页
作者
Groth Moritz; Ponto Kate; Shulman Michael;
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原文格式 PDF
正文语种 eng
中图分类数学;
关键词
duality; trace; Euler characteristic; derivator; triangulated category; monoidal category;

机译：二元性痕量欧拉特性导数三角分类单项分类;

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3. A note on the biadjunction between 2-categories of traced monoidal categories and tortile monoidal categories [J] . MASAHITO HASEGAWA, SHIN-YA KATSUMATA Mathematical Proceedings of the Cambridge Philosophical Society . 2010,第1期

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4. Additivity for derivator K-theory [J] . Cisinski DC, Neeman A Advances in Mathematics . 2008,第4期

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机译：通过中子活化分析和铅，锆，钛酸铅陶瓷的压电特性（通过少量的稀土，铀和HA添加剂修饰）来测定铅酸锆钛酸盐陶瓷中的稀土和其他痕量杂质。
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机译：幺半群导数中迹线的相加性

The additivity of traces in monoidal derivators

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