Quadratic $d$-numbers
Abstract
Here we constructively classify quadratic -numbers: algebraic integers in quadratic number fields generating Galois-invariant ideals. We prove the subset thereof maximal among their Galois conjugates in absolute value is discrete in . Our classification provides a characterization of those real quadratic fields containing a unit of norm -1 which is known to be equivalent to the existence of solutions to the negative Pell equation. The notion of a weakly quadratic fusion category is introduced whose Frobenius-Perron dimension necessarily lies in this discrete set. Factorization, divisibility, and boundedness results are proven for quadratic -numbers allowing a systematic study of weakly quadratic fusion categories which constitute essentially all known examples of fusion categories having no known connection to classical representation theory.
Cite
@article{arxiv.1904.09418,
title = {Quadratic $d$-numbers},
author = {Andrew Schopieray},
journal= {arXiv preprint arXiv:1904.09418},
year = {2019}
}
Comments
26 pages. Comments welcome