English

$p$-Bifree biset functors

Representation Theory 2025-05-23 v1

Abstract

We introduce and study the category of pp-bifree biset functors for a fixed prime pp, defined via bisets whose left and right stabilizers are pp'-groups. This category naturally lies between the classical biset functors and the diagonal pp-permutation functors, serving as a bridge between them. Every biset functor and every diagonal pp-permutation functor restricts to a pp-bifree biset functor. We classify the simple pp-bifree biset functors over a field KK of characteristic zero, showing that they are parametrized by pairs (G,V)(G,V), where GG is a finite group and VV is a simple KOut(G)K\mathrm{Out}(G)-module. As key examples, we compute the composition factors of several representation-theoretic functors in the pp-bifree setting, including the Burnside ring functor, the pp-bifree Burnside functor, the Brauer character ring functor, and the ordinary character ring functor. We further investigate classical simple biset functors, SCp×Cp,CS_{C_p \times C_p, \mathbb{C}} and SCq×Cq,CS_{C_q \times C_q, \mathbb{C}} for a prime qpq\neq p.

Cite

@article{arxiv.2505.16719,
  title  = {$p$-Bifree biset functors},
  author = {Olcay Coşkun and Deniz Yılmaz},
  journal= {arXiv preprint arXiv:2505.16719},
  year   = {2025}
}
R2 v1 2026-07-01T02:31:41.144Z