On free abelian categories for theorem proving
Abstract
We give a computational approach to theorem proving in homological algebra. This approach is based on computations in the free abelian category of an additive category A. We show that the free abelian category is amenable to explicit computations whenever we can decide homotopy equations in A. As some consequences of our investigations, we recover Dowker's explicit formula for the connecting homomorphism ∂ in the snake lemma, we find a universal sense in which ∂ is unique, and we give a refined version of the 5-lemma.
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