On quotients of generalized Euclidean group rings
Abstract
Let R = Z[C] be the integral group ring of a finite cyclic group C. Dennis and al. proved that R is a generalized Euclidean ring in the sense of P. M. Cohn, i.e., SLn(R) is generated by the elementary matrices for all n. We prove that every proper quotient of R is also a generalized Euclidean ring.
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