Verdier quotients of homotopy categories
Abstract
We study Verdier quotients of diverse homotopy categories of a full additive subcategory E of an abelian category. In particular, we consider the categories Kx,y( E) for x∈\∞, +,-,b\, and y∈\,b,+,-,∞\ the homotopy categories of left, right, unbounded complexes with homology being 0, bounded, left or right bounded, or unbounded. Inclusion of these categories give a partially ordered set, and we study localisation sequences or recollement diagrams between the Verdier quotients, and prove that many quotients lead to equivalent categories.
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