The structure of ZnG and its unit group
Abstract
This article determines the structure of the group ring ZnG, where G is a finite group and Zn is the ring of integers modulo n, such that n is relatively prime to the order of G. The decomposition of ZnG is given as a direct sum of matrix rings over Galois rings, thereby extending the structural theory of group rings beyond the classical field setting. We also provide a method to compute a generating set of the unit group U(ZnG), in terms of elementary matrices, using Shoda pair theory. The results are illustrated with examples.
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