The quotients of the p-adic group ring of a cyclic group of order p
Abstract
We classify, up to isomorphism, the ZpG-modules of rank 1 (i.e., the quotients of ZpG) for G cyclic of order p, where Zp is the ring of p-adic integers. This allows us in particular to determine effectively the quotients of ZpG which are cohomologically trivial over G. There are natural zeta functions associated to ZpG for which we give an explicit formula.
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