Spectra of Modules

This manuscript solves the problem that the so-called “stable category” Λ of an Artin algebra is in general not triangulated. The method is to mimick topology and hence first form the Spanier–Whitehead category ( Λ) and then construct a category of “spectra of modules” which completes the compact part of ( Λ) under small coproducts. is then a triangulated substitute for Λ. The main results are that is a compactly generated triangulated category which contains the compact part of ( Λ) as a full subcategory and even admits a precise description of its compact objects, which only form a small set of isomorphism classes. As an application, it is proved that over an Artin algebra, the Gorenstein projective modules form a pre-covering class. This was previously only known for rings satisfying strong homological conditions.