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dc.contributor.authorMollov, T.Z.-
dc.contributor.authorNachev, N.A.-
dc.date.accessioned2018-12-21T10:21:56Z-
dc.date.available2018-12-21T10:21:56Z-
dc.date.issued2018-12-21-
dc.identifier.urihttp://localhost:8080/xmlui/handle/123456789/1046-
dc.description.abstractLet R be a commutative ring with identity. An algebraic element over R is called an “integral algebraic element” over R if there exists a minimal polynomial of over R which is monic. Let R be a direct product of m indecomposable rings Ri m ∈ . Denote by RG the group ring of G over R and by R∗ the multiplicative group of R. Let G be a finite Abelian group of exponent n and n ∈ R. In this paper we give a decomposition of RG, up to isomorphism, into a direct sum of extensions of the ring R, taking into account the number of the repetitions of these extensions. If the ring R is a field, then this result is proved in Perlis and Walker (1950). Let G be a splitting Abelian group with a torsion subgroup G0. Denote by Gp the p-component of G. We give a description of the unit group URG of RG in the following cases: (i) when Ri is a ring of prime characteristic pi, G0/Gpi is finite and the exponent of G0/Gpi belongs to R∗ i ; (ii) when Ri is of characteristic zero, Ri has no nilpotents, G0 is finite of exponent n and n ∈ R∗ i . For the establishment of these results we prove that if the ring R is indecomposable and n ∈ R∗, then: (i) the cyclotomic polynomial nx has a unique decomposition in a product of monic irreducible factors over R; and (ii) if and are integral algebraic elements over R which are roots of monic irreducible divisors of the cyclotomic polynomial nx , then the rings R and R are isomorphic.en_US
dc.language.isoen_USen_US
dc.subjectCommutative group ringsen_US
dc.subjectCyclotomic polynomials over ringsen_US
dc.subjectDirect product of indecomposable ringen_US
dc.subjectMixed Abelian groupsen_US
dc.subjectNilpotent elementsen_US
dc.titleUnit groups of commutative group ringsen_US
dc.typeArticleen_US
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