Rank-finiteness for modular categories
Abstract
We prove a rank-finiteness conjecture for modular categories: up to equivalence, there are only finitely many modular categories of any fixed rank. Our technical advance is a generalization of the Cauchy theorem in group theory to the context of spherical fusion categories. For a modular category with , the order of the modular -matrix, the Cauchy theorem says that the set of primes dividing the global quantum dimension in the Dedekind domain is identical to that of .
Cite
@article{arxiv.1310.7050,
title = {Rank-finiteness for modular categories},
author = {Paul Bruillard and Siu-Hung Ng and Eric C. Rowell and Zhenghan Wang},
journal= {arXiv preprint arXiv:1310.7050},
year = {2015}
}
Comments
25 pages (last version). Version 2: removed weakly integral rank 6 and integral rank 7 section, improved rank 5 classification up to monoidal equivalence. Version 3: removed rank 5 classification (note title change)--this will be published separately. Significantly improved exposition