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Mathlib.Algebra.Homology.ShortComplex.ConcreteCategory

Exactness of short complexes in concrete abelian categories #

If an additive concrete category C has an additive forgetful functor to Ab which preserves homology, then a short complex S in C is exact if and only if it is so after applying the functor forget₂ C Ab.

Constructor for cycles of short complexes in a concrete category.

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Instances For

    This lemma allows the computation of the connecting homomorphism D.δ when D : SnakeInput C and C is a concrete category.

    This lemma allows the computation of the connecting homomorphism D.δ when D : SnakeInput C and C is a concrete category.