PlanetPhysics/B Mod Category Equivalence Theorem

\begin{theorem}{\mathbf B-mod category equivalence theorem.}

Let ${\displaystyle 𝒜}$ be an [[../AbelianCategory2/|abelian category]] with arbitrary direct sums (or coproducts). Also, let ${\displaystyle P}$ in ${\displaystyle 𝒜}$ be a compact projective generator and set ${\displaystyle B=(En{d}_{𝒜}P{)}^{op}}$. The [[../TrivialGroupoid/|functor]] ${\displaystyle ho{m}_{𝒜}(P,--)}$ yields an equivalence of [[../Cod/|categories]] between ${\displaystyle 𝒜}$ and the category ${\displaystyle B-mod}$. \end{theorem}

Proof. The proof proceeds in two steps. At the first step one shows that the functor ${\displaystyle F(X)=ho{m}_{𝒜}(P,X)}$ is [[../FullyFaithfulFunctor2/|fully faithful]], and therefore, at the second step one can apply the [[../AbelianCategoryEquivalenceLemma/|Abelian category equivalence lemma]] to yield the sought for equivalence of categories.

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