Fermionic Rational Conformal Field Theories and Modular Linear Differential Equations
Abstract
We define Modular Linear Differential Equations (MLDE) for the level-two congruence subgroups , and of . Each subgroup corresponds to one of the spin structures on the torus. The pole structures of the fermionic MLDEs are investigated by exploiting the valence formula for the level-two congruence subgroups. We focus on the first and second order holomorphic MLDEs without poles and use them to find a large class of `Fermionic Rational Conformal Field Theories', which have non-negative integer coefficients in the -series expansion of their characters. We study the detailed properties of these fermionic RCFTs, some of which are supersymmetric. This work also provides a starting point for the classification of the fermionic Modular Tensor Category.
Cite
@article{arxiv.2010.12392,
title = {Fermionic Rational Conformal Field Theories and Modular Linear Differential Equations},
author = {Jin-Beom Bae and Zhihao Duan and Kimyeong Lee and Sungjay Lee and Matthieu Sarkis},
journal= {arXiv preprint arXiv:2010.12392},
year = {2021}
}
Comments
63 pages, 4 figures, 19 tables, references added, minor corrections