On the non-periodic stable Auslander--Reiten Heller component for the Kronecker algebra over a complete discrete valuation ring

Abstract

We consider the Kronecker algebra A=O[X, Y]/(X2, Y2), where O is a complete discrete valuation ring. Since A is a special biserial algebra, where is the residue field of O, one can compute a complete list of indecomposable A-modules. For each indecomposable A-module, we obtain a special kind of A-lattices called "Heller lattices". In this paper, we determine the non-periodic component of a variant of the stable Auslander--Reiten quiver for the category of A-lattices that contains "Heller lattices". Moreover, we give the strong restrictions on stable Auslander--Reiten quivers for symmetric orders over a complete discrete valuation ring.