The stable category of Gorenstein-projective modules over a monomial algebra

Abstract

Let be an arbitrary monomial algebra. We investigate the stable category GprojZ of graded Gorenstein-projective -modules and the orbit category GprojZ /(1) induced by GprojZ and the degree shift functor (1). We prove that GprojZ is triangle equivalent to the bounded derived category of a path algebra of Dynkin type A and that GprojZ/(1) is triangle equivalent to the stable module category of a self-injective Nakayama algebra. Both the path algebra and the self-injective Nakayama algebra will be given explicitly. The latter result provides an explicit description of the stable category of (ungraded) Gorenstein-projective -modules.

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