Abstract Let AA and BB be abelian categories and F: A → BF: A→ B an additive and right
exact functor which is perfect, and let (F, B)(F, B) be the left comma category. We give an …

Let A and B be abelian categories and F: A→ B an additive and right exact functor which is
perfect, and let (F, B) be the left comma category. We give an equivalent characterization of …

Let A and B be abelian categories and F: A→ B an additive and right exact functor which is
perfect, and let (F, B) be the left comma category. We give an equivalent characterization of …

Abstract Let $\mathcal {A} $ and $\mathcal {B} $ be abelian categories and $\mathbf
{F}:\mathcal {A}\to\mathcal {B} $ an additive and right exact functor which is perfect, and let …

Let $\mathcal {A} $ and $\mathcal {B} $ be abelian categories and $\mathbf {F}:\mathcal
{A}\to\mathcal {B} $ an additive and right exact functor which is perfect, and let $(\mathbf …

Let A and B be abelian categories and F: A→ B an additive and right exact functor which is
perfect, and let (F, B) be the left comma category. We give an equivalent characterization of …