富函子的Grothendieck类的派生类

Model Theory of Modules, Algebras and Categories Pub Date : 2018-03-26 DOI:10.1090/CONM/730/14708

G. Garkusha, Darren J. R. Jones

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引用次数: 4

摘要

研究了富函子$[C,V]$的Grothendieck类$[C,V]$的派生类$D[C,V]$，其中$V$是一个闭合对称的一元Grothendieck类，$C$是一个小的$V$-类。证明了如果$V$的派生范畴$D(V)$是紧生成三角化范畴，并且在紧生成元或$K$内射分辨率上有一定的合理假设，则派生范畴$D[C,V]$也是紧生成三角化范畴。此外，还对这些发生器进行了详细的描述。

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Derived categories for Grothendieck categories of enriched functors

The derived category $D[C,V]$ of the Grothendieck category of enriched functors $[C,V]$, where $V$ is a closed symmetric monoidal Grothendieck category and $C$ is a small $V$-category, is studied. We prove that if the derived category $D(V)$ of $V$ is a compactly generated triangulated category with certain reasonable assumptions on compact generators or $K$-injective resolutions, then the derived category $D[C,V]$ is also compactly generated triangulated. Moreover, an explicit description of these generators is given.

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Model Theory of Modules, Algebras and Categories

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