Abstract representation theory via coherent Auslander-Reiten diagrams
Abstract
We provide a general method to study representations of quivers over abstract stable homotopy theories (e.g. arbitrary rings, schemes, dg algebras, or ring spectra) in terms of Auslander-Reiten diagrams. For a finite acyclic quiver Q and a stable ∞-category C, we prove an abstract equivalence of the representations CQ with a certain mesh ∞-category CZQ,\, mesh of representations of the repetitive quiver ZQ, that we build inductively using abstract reflection functors. This allows to produce, from the symmetries of the Auslander-Reiten quiver, universal autoequivalences of representations CQ in any stable ∞-category C, which are the elements of the spectral Picard group of Q. In particular, we get abstract versions of key functors in classical representation theory -- e.g. reflection functors, the Auslander-Reiten translation, the Serre functor, etc. Moreover, for representations of trees this enables us to realize the whole derived Picard group over a field as a factor of the spectral Picard group.
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