On Witten's extremal partition functions
Number Theory
2019-04-18 v3
Abstract
In his famous 2007 paper on three dimensional quantum gravity, Witten defined candidates for the partition functions of potential extremal CFTs with central charges of the form . Although such CFTs remain elusive, he proved that these modular functions are well-defined. In this note, we point out several explicit representations of these functions. These involve the partition function , Faber polynomials, traces of singular moduli, and Rademacher sums. Furthermore, for each prime , the series , where possess a Ramanujan congruence. More precisely, for every non-zero integer we have that
Cite
@article{arxiv.1807.00444,
title = {On Witten's extremal partition functions},
author = {Ken Ono and Larry Rolen},
journal= {arXiv preprint arXiv:1807.00444},
year = {2019}
}
Comments
8 pages