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Q-category

From Wikipedia, the free encyclopedia

In mathematics, a Q-category or almost quotient category^[1] is a category that is a "milder version of a Grothendieck site."^[2] A Q-category is a coreflective subcategory.^[1]^{[clarification needed]} The Q stands for a quotient.

The concept of Q-categories was introduced by Alexander Rosenberg in 1988.^[2] The motivation for the notion was its use in noncommutative algebraic geometry; in this formalism, noncommutative spaces are defined as sheaves on Q-categories.

Definition

A Q-category is defined by the formula^[1]^{[further explanation needed]}

\mathbb {A} :(u^{*}\dashv u_{*}):{\bar {A}}{\stackrel {\overset {u^{*}}{\leftarrow }}{\underset {u_{*}}{\to }}}A

where

u^{*}

is the left adjoint in a pair of adjoint functors and is a full and faithful functor.

Examples

The category of presheaves over any Q-category is itself a Q-category.^[1]
For any category, one can define the Q-category of cones.^[1]^{[further explanation needed]}
There is a Q-category of sieves.^[1]^{[clarification needed]}

References

^ ^a ^b ^c ^d ^e ^f Škoda, Zoran; Schreiber, Urs; Mrđen, Rafael; Fritz, Tobias (14 September 2017). "Q-category". nLab. Retrieved 25 March 2023.
^ ^a ^b Kontsevich & Rosenberg 2004a, § 1.

Kontsevich, Maxim; Rosenberg, Alexander (2004a). "Noncommutative spaces" (PDF). ncatlab.org. Retrieved 25 March 2023.
Alexander Rosenberg, Q-categories, sheaves and localization, (in Russian) Seminar on supermanifolds 25, Leites ed. Stockholms Universitet 1988.

Further reading

Kontsevich, Maxim; Rosenberg, Alexander (2004b). "Noncommutative stacks". ncatlab.org. Retrieved 25 March 2023.
Brzezinski, Tomasz (29 October 2007). Brzeziński, Tomasz; Pardo, José Luis Gómez; Shestakov, Ivan; Smith, Patrick F. (eds.). Notes on formal smoothness. Modules and Comodules. arXiv:0710.5527. doi:10.1007/978-3-7643-8742-6.
Lawvere, F. William (2007). "Axiomatic Cohesion" (PDF). Theory and Applications of Categories. 19 (3): 41–49.

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This page was last edited on 27 September 2023, at 02:33

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