English

The Lie module and its complexity

Group Theory 2017-05-17 v1

Abstract

The complexity of a module is an important homological invariant that measures the polynomial rate of growth of its minimal projective resolution. For the symmetric group Σn\Sigma_n, the Lie module Lie(n)\mathsf{Lie}(n) has attracted a great deal of interest in recent years. We prove here that the complexity of Lie(n)\mathsf{Lie}(n) in characteristic pp is tt where ptp^t is the largest power of pp dividing nn, thus proving a conjecture of Erdmann, Lim and Tan. The proof uses work of Arone and Kankaanrinta which describes the homology H(Σn,Lie(n))\operatorname{H}_\bullet(\Sigma_n, \mathsf{Lie}(n)) and earlier work of Hemmer and Nakano on complexity for modules over Σn\Sigma_n that involves restriction to Young subgroups.

Keywords

Cite

@article{arxiv.1503.01545,
  title  = {The Lie module and its complexity},
  author = {Frederick R. Cohen and David J. Hemmer and Daniel K. Nakano},
  journal= {arXiv preprint arXiv:1503.01545},
  year   = {2017}
}
R2 v1 2026-06-22T08:44:54.039Z