Representation growth of compact linear groups
Abstract
We study the representation growth of simple compact Lie groups and of , where is a compact discrete valuation ring, as well as the twist representation growth of . This amounts to a study of the abscissae of convergence of the corresponding (twist) representation zeta functions. We determine the abscissae for a class of Mellin zeta functions which include the Witten zeta functions. As a special case, we obtain a new proof of the theorem of Larsen and Lubotzky that the abscissa of Witten zeta functions is , where is the rank and the number of positive roots. We then show that the twist zeta function of exists and has the same abscissa of convergence as the zeta function of , provided does not divide . We compute the twist zeta function of when the residue characteristic of is odd, and approximate the zeta function when to deduce that the abscissa is . Finally, we construct a large part of the representations of , even, and deduce that its abscissa lies in the interval .
Cite
@article{arxiv.1710.09112,
title = {Representation growth of compact linear groups},
author = {Jokke Häsä and Alexander Stasinski},
journal= {arXiv preprint arXiv:1710.09112},
year = {2018}
}
Comments
56 pages; several smaller changes and corrections; added Lemma 2.2; corrected lower bound in Theorem 5.9