A recognition theorem for permutation modules over p-groups extending Weiss' Theorem

Abstract

Let G be a finite p-group with normal subgroup N, and R a complete discrete valuation ring in mixed characteristic. We characterize permutation RG-modules in terms of modules for RN and R[G/N]. The result generalizes both the seminal detection theorem for permutation modules due to Weiss, who characterizes those permutation RG-modules that are RN-free when R is a finite extension of Zp, and a more recent result of MacQuarrie and Zalesskii, who prove a characterization of permutation modules when N has order p and R = Zp.

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