2-Periodic complexes over regular local rings
Abstract
Let (A,m) be a regular local ring of dimension d ≥ 1. Let D2fg(A) denote the derived category of 2-periodic complexes with finitely generated cohomology modules. Let K2( A) denote the homotopy category of 2-periodic complexes of finitely generated free A-modules. We show the natural map K2(\ proj \ A) D2(A) is an equivalence of categories. When A is complete we show that K2f(\ proj \ A) (2-periodic complexes with finite length cohomology) is Krull-Schmidt with Auslander-Reiten (AR) triangles. We also compute the AR-quiver of K2f(\ proj \ A) when \ dim \ A = 1.
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