Coxeter Elements and Periodic Auslander-Reiten Quiver
Abstract
In this paper we show that for a simply-laced root system a choice of C gives rise to a natural construction of the Dynkin diagram, in which vertices of the diagram correspond to C-orbits in R; moreover, it gives an identification of R with a certain subset Ihat of I x Z2h, where h is the Coxeter number. The set Ihat has a natural quiver structure; we call it the periodic Auslander-Reiten quiver. This gives a combinatorial construction of the root system associated with the Dynkin diagram I: roots are vertices of Ihat, and the root lattice and the inner product admit an explicit description in terms of Ihat. Finally, we relate this construction to the theory of quiver representations.
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