The snail lemma and the long homology sequence
Abstract
In the first part of the paper, we establish an homotopical version of the snail lemma (which is a generalization of the classical snake lemma). In the second part, we introduce the category Seq( A) of sequentiable families of arrows in a category A and we compare it with the category of chain complexes in A. We apply the homotopy snail lemma to a morphism in Seq( A) obtaining first a six-term exact sequence in Seq( A) and then, unrolling the sequence in Seq( A), a long exact sequence in A. When A is abelian, this sequence subsumes the usual long homology sequence obtained from an extension of chain complexes.
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