Giraud subcategory: Difference between revisions

Template:Short description In mathematics, Giraud subcategories form an important class of subcategories of Grothendieck categories. They are named after Jean Giraud.

Let ${\displaystyle 𝒜}$ be a Grothendieck category. A full subcategory ${\displaystyle ℬ}$ is called reflective, if the inclusion functor ${\displaystyle i:ℬ\to 𝒜}$ has a left adjoint. If this left adjoint of ${\displaystyle i}$ also preserves kernels, then ${\displaystyle ℬ}$ is called a Giraud subcategory.

Let ${\displaystyle ℬ}$ be Giraud in the Grothendieck category ${\displaystyle 𝒜}$ and ${\displaystyle i:ℬ\to 𝒜}$ the inclusion functor.

• ${\displaystyle ℬ}$ is again a Grothendieck category.
• An object ${\displaystyle X}$ in ${\displaystyle ℬ}$ is injective if and only if ${\displaystyle i(X)}$ is injective in ${\displaystyle 𝒜}$.
• The left adjoint ${\displaystyle a:𝒜\to ℬ}$ of ${\displaystyle i}$ is exact.
• Let ${\displaystyle 𝒞}$ be a localizing subcategory of ${\displaystyle 𝒜}$ and ${\displaystyle 𝒜/𝒞}$ be the associated quotient category. The section functor ${\displaystyle S:𝒜/𝒞\to 𝒜}$ is fully faithful and induces an equivalence between ${\displaystyle 𝒜/𝒞}$ and the Giraud subcategory ${\displaystyle ℬ}$ given by the ${\displaystyle 𝒞}$-closed objects in ${\displaystyle 𝒜}$.

• Localizing subcategory

• Bo Stenström; 1975; Rings of quotients. Springer.