Permutation modules over cyclic p-groups

Abstract

Let G be a cyclic p-group for some prime number p>0 and let R be a complete discrete valuation ring in mixed characteristic. In this paper, we present a generalization of two results that characterize RG-permutation modules, extending previous work by B. Torrecillas and Th. Weigel. Their original results were established under the assumption that p is unramified in R, whereas we extend their characterization to the case where p may be ramified. Unlike prior approaches, our proofs rely solely on fundamental facts from group cohomology and a version of Weiss' Theorem, avoiding deeper categorical techniques.

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