On periodic stable Auslander-Reiten components containing Heller lattices over the symmetric Kronecker algebra
Abstract
Let O be a complete discrete valuation ring, K its quotient field, and A the symmetric Kronecker algebra over O. We consider the full subcategory of the category of A-lattices whose objects are A-lattices M such that MOK is projective AOK-modules. In this paper, we study Heller lattices of indecomposable periodic modules over A. As a main result, we determine the shapes of stable Auslander--Reiten components containing Heller lattices of indecomposable periodic modules over A.
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