Abstract:
Let $F$ be a finite extension of the field $Q_p$ of rational $p$-adic numbers, $R$ the ring of all integral elements of $F$, $ R^*$ the multiplicative group of $R$, $G$ a finite group, and $\Lambda=(G,R,\lambda)$ the crossed group ring of $G$ and $R$ with the factor system $\{\lambda_{a,b}\}$ ($\lambda_{a,b}\in R^*$; $a,b\in G$). A classification is given of the rings $\Lambda$ for which the number of indecomposable $R$-representations is finite. When $\Lambda$ is a group ring, this problem was solved in papers by Faddeev, Borevich, Gudivok, Yakobinskii, and others.
Bibliography: 22 titles.
Citation:
L. F. Barannik, P. M. Gudivok, “Crossed group rings of finite groups and rings of $p$-adic integers with finitely many indecomposable integral representations”, Math. USSR-Sb., 36:2 (1980), 173–194
\Bibitem{BarGud79}
\by L.~F.~Barannik, P.~M.~Gudivok
\paper Crossed group rings of finite groups and rings of $p$-adic integers with finitely many indecomposable integral representations
\jour Math. USSR-Sb.
\yr 1980
\vol 36
\issue 2
\pages 173--194
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\crossref{https://doi.org/10.1070/SM1980v036n02ABEH001781}
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