Infinitely generated pseudocompact modules for finite groups and Weiss' Theorem
Abstract
One of the most beautiful results in the integral representation theory of finite groups is a theorem of A. Weiss that detects a permutation -lattice for the finite -group in terms of the restriction to a normal subgroup and the -fixed points of the lattice, where is a finite extension of the -adic integers. Using techniques from relative homological algebra, we generalize Weiss' Theorem to the class of infinitely generated pseudocompact lattices for a finite -group, allowing to be any complete discrete valuation ring in mixed characteristic. A related theorem of Cliff and Weiss is also generalized to this class of modules. The existence of the permutation cover of a pseudocompact module is proved as a special case of a more general result. The permutation cover is explicitly described.
Cite
@article{arxiv.1803.01740,
title = {Infinitely generated pseudocompact modules for finite groups and Weiss' Theorem},
author = {John MacQuarrie and Peter Symonds and Pavel Zalesskii},
journal= {arXiv preprint arXiv:1803.01740},
year = {2020}
}
Comments
Final version. Published in Advances in Mathematics