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Galois coverings of selfinjective algebras by repetitive algebras

Authors:	Andrzej Skowronski Kunio Yamagata

Institution:	Faculty of Mathematics and Informatics, Nicholas Copernicus University, Chopina 12/18, 87-100 Torun, Poland ; Department of Mathematics, Tokyo University of Agriculture and Technology, Fuchu, Tokyo 183, Japan

Abstract:	In the representation theory of selfinjective artin algebras an important role is played by selfinjective algebras of the form $\widehat {B}/G$ where $\widehat {B}$ is the repetitive algebra of an artin algebra and is an admissible group of automorphisms of $\widehat {B}$ . If is of finite global dimension, then the stable module category $\underline{\operatorname{mod}} \widehat {B}$ of finitely generated $\widehat {B}$ -modules is equivalent to the derived category $D^{b} (\operatorname{mod} B)$ of bounded complexes of finitely generated -modules. For a selfinjective artin algebra , an ideal and , we establish a criterion for to admit a Galois covering $F: \widehat {B}\to \widehat {B}/G=A$ with an infinite cyclic Galois group . As an application we prove that all selfinjective artin algebras whose Auslander-Reiten quiver $\Gamma _{A}$ has a non-periodic generalized standard translation subquiver closed under successors in $\Gamma _{A}$ are socle equivalent to the algebras $\widehat {B}/G$ , where is a representation-infinite tilted algebra and is an infinite cyclic group of automorphisms of $\widehat{B}$ .

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