Units of ZCpn
Abstract
Let p be a prime integer and n,i be positive integers such that S=\-1, \ θ, \ μi=1+θ+... + θi-1 \ 1 < i < pn2, \ gcd(pn,i)=1 \ generates the group of units of Z[θ], where θ is a primitive pn--th root of unity. Denote by Cpn the cyclic group of order pn. In this paper we describe explicitly a multiplicatively independent set which generates a complement to Cpn in the group of units of the integral group ring of Cpn.
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