论权结构的构造及其幂等扩展

M. Bondarko, V. Sosnilo
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引用次数: 30

摘要

我们描述了在三角分类C上构造权结构w的一种新方法。对于给定的$C$和$w$,它允许我们对由$C$对象的收缩(即包含$C$的$C$的Karoubi包络的子类别)组成的三角分类给出一个相当全面(和新的)描述;我们称它们为$C$的幂等扩展,使得$w$扩展到它们。特别地,任何大于或小于$w$的有界扩展到$C$的幂等扩展。我们还讨论了我们的结果在某些三角分类(“相对”)动机中的应用。
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On constructing weight structures and extending them to idempotent extensions
We describe a new method for constructing a weight structure $w$ on a triangulated category $C$. For a given $C$ and $w$ it allow us to give a fairly comprehensive (and new) description of those triangulated categories consisting of retracts of objects of $C$ (i.e., of subcategories of the Karoubi envelope of $C$ that contain $C$; we call them idempotent extensions of $C$) such that $w$ extends to them. In particular, any bounded above or below $w$ extends to any idempotent extension of $C$. We also discuss the applications of our results to certain triangulated categories of ("relative") motives.
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