Reductions of tensor categories modulo primes
Quantum Algebra
2011-02-15 v1
Abstract
We study good (i.e., semisimple) reductions of semisimple rigid tensor categories modulo primes. A prime p is called good for a semisimple rigid tensor category C if such a reduction exists (otherwise, it is called bad). It is clear that a good prime must be relatively prime to the M\"uger squared norm |V|^2 of any simple object V of C. We show, using the Ito-Michler theorem in finite group theory, that for group-theoretical fusion categories, the converse is true. While the converse is false for general fusion categories, we obtain results about good and bad primes for many known fusion categories (e.g., for Verlinde categories). We also state some questions and conjectures regarding good and bad primes.
Cite
@article{arxiv.1102.2517,
title = {Reductions of tensor categories modulo primes},
author = {Pavel Etingof and Shlomo Gelaki},
journal= {arXiv preprint arXiv:1102.2517},
year = {2011}
}
Comments
11 pages