English

Diagonal $p$-permutation functors in characteristic $p$

Group Theory 2024-11-11 v1 Category Theory Rings and Algebras Representation Theory

Abstract

Let pp be a prime number. We consider diagonal pp-permutation functors over a (commutative, unital) ring R\mathsf{R} in which all prime numbers different from pp are invertible. We first determine the finite groups GG for which the associated essential algebra ER(G)\mathcal{E}_\mathsf{R}(G) is non zero: These are groups of the form G=LuG=L\rtimes \langle u\rangle, where (L,u)(L,u) is a DΔD^\Delta-pair. When R\mathsf{R} is an algebraically closed field F\mathbb{F} of characteristic 0 or pp, this yields a parametrization of the simple diagonal pp-permutation functors over F\mathbb{F} by triples (L,u,W)(L,u,W), where (L,u)(L,u) is a DΔD^\Delta-pair, and WW is a simple FOut(L,u)\mathbb{F}\mathrm{Out}(L,u)-module. Finally, we describe the evaluations of the simple functor SL,u,W\mathsf{S}_{L,u,W} parametrized by the triple (L,u,W)(L,u,W). We show in particular that if GG is a finite group and F\mathbb{F} has characteristic pp, the dimension of SL,1,F(G)\mathsf{S}_{L,1,\mathbb{F}}(G) is equal to the number of conjugacy classes of pp-regular elements of GG with defect isomorphic to LL.

Keywords

Cite

@article{arxiv.2411.05700,
  title  = {Diagonal $p$-permutation functors in characteristic $p$},
  author = {Serge Bouc and Deniz Yılmaz},
  journal= {arXiv preprint arXiv:2411.05700},
  year   = {2024}
}
R2 v1 2026-06-28T19:53:16.645Z