Young module multiplicities and classifying the indecomposable Young permutation modules
Representation Theory
2015-10-07 v2
Abstract
We study the multiplicities of Young modules as direct summands of permutation modules on cosets of Young subgroups. Such multiplicities have become known as the p-Kostka numbers. We classify the indecomposable Young permutation modules, and, applying the Brauer construction for p-permutation modules, we give some new reductions for p-Kostka numbers. In particular we prove that p-Kostka numbers are preserved under multiplying partitions by p, and strengthen a known reduction given by Henke, corresponding to adding multiples of a p-power to the first row of a partition.
Cite
@article{arxiv.1203.6370,
title = {Young module multiplicities and classifying the indecomposable Young permutation modules},
author = {Christopher C. Gill},
journal= {arXiv preprint arXiv:1203.6370},
year = {2015}
}
Comments
22 pages