PlanetPhysics/Grothendieck Category Lemma

Introduction: proper generator

Let us recall that a generator of a Grothendieck category ${\mathcal {G}}$ is called proper if $U$ has the property that a monomorphism $i:U'\to U$ induces an isomorphism $Hom_{\mathcal {G}}(U,U)\cong Hom_{\mathcal {G}}(U',U)$ if and only if $i$ is an isomorphism (viz. p. 251 in ref. ^[1]).

Grothendieck category lemma

\begin{lemma} Any Grothendieck category ${\mathcal {G}}$ has a proper generator. \end{lemma}

All Sources

^[1] ^[2] ^[3]

References

↑ ^1.0 ^1.1 Nicolae Popescu. Abelian Categories with Applications to Rings and Modules. , Academic Press: New York and London, 1973 and 1976 edns., (English translation by I. C. Baianu .)
↑ Leila Schneps. 1994. The Grothendieck Theory of Dessins d'Enfants. (London Mathematical Society Lecture Note Series), Cambridge University Press, 376 pp.
↑ David Harbater and Leila Schneps. 2000. Fundamental groups of moduli and the Grothendieck-Teichm\"uller group, Trans. Amer. Math. Soc . 352 (2000), 3117-3148. MSC: Primary 11R32, 14E20, 14H10; Secondary 20F29, 20F34, 32G15.

[NP65-1] 1.0 ^1.1 Nicolae Popescu. Abelian Categories with Applications to Rings and Modules. , Academic Press: New York and London, 1973 and 1976 edns., (English translation by I. C. Baianu .)

[LS94-2] Leila Schneps. 1994. The Grothendieck Theory of Dessins d'Enfants. (London Mathematical Society Lecture Note Series), Cambridge University Press, 376 pp.

[DHSL2k-3] David Harbater and Leila Schneps. 2000. Fundamental groups of moduli and the Grothendieck-Teichm\"uller group, Trans. Amer. Math. Soc . 352 (2000), 3117-3148. MSC: Primary 11R32, 14E20, 14H10; Secondary 20F29, 20F34, 32G15.

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