English

On semisimplification of tensor categories

Representation Theory 2019-11-12 v4

Abstract

We develop the theory of semisimplifications of tensor categories defined by Barrett and Westbury. In particular, we compute the semisimplification of the category of representations of a finite group in characteristic pp in terms of representations of the normnalizer of its Sylow pp-subgroup. This allows us to compute the semisimplification of the representation category of the symmetric group Sn+pS_{n+p} in characteristic pp, where 0np10\le n\le p-1, and of the Deligne category RepabSt\underline{\rm Rep}^{\rm ab}S_t, where tNt\in \Bbb N. We also compute the semisimplification of the category of representations of the Kac-De Concini quantum group of the Borel subalgebra of sl2\mathfrak{sl}_2. We also study tensor functors between Verlinde categories of semisimple algebraic groups arising from the semisimplification construction, and objects of finite type in categories of modular representations of finite groups (i.e., objects generating a fusion category in the semisimplification). Finally, we determine the semisimplifications of the tilting categories of GL(n)GL(n), SL(n)SL(n) and PGL(n)PGL(n) in characteristic 22. In the appendix, we classify categorifications of the Grothendieck ring of representations of SO(3)SO(3) and its truncations.

Keywords

Cite

@article{arxiv.1801.04409,
  title  = {On semisimplification of tensor categories},
  author = {Pavel Etingof and Victor Ostrik},
  journal= {arXiv preprint arXiv:1801.04409},
  year   = {2019}
}

Comments

32 pages, latex; in v2 minor changes have been made, and the end of Section 7 as well as Section 8 are new; in v3 the nonsymmetric version of Andre-Kahn results on p.11-12 has been added

R2 v1 2026-06-22T23:44:19.463Z