Classifying three-character RCFTs with Wronskian index equalling 3 or 4

TL;DR

This paper classifies three-character rational conformal field theories with specific Wronskian indices by solving associated modular linear differential equations, revealing infinite families, discrete solutions, and coset relations that aid in identifying these theories.

Contribution

It provides the first systematic classification of [3,3] and [3,4] RCFTs through solving MLDEs, discovering new solution families and coset-bilinear relations.

Findings

Found four infinite families and 15 discrete solutions for [3,3] RCFTs.

Identified coset-bilinear relations connecting solutions to known meromorphic CFTs.

Obtained nine solutions for [3,4] RCFTs, linking them to [2,2] solutions.

Abstract

In the Mathur-Mukhi-Sen (MMS) classification scheme for rational conformal field theories (RCFTs), a RCFT is identified by a pair of non-negative integers $\mathbf{[n, \ell]}$, with $\mathbf{n}$ being the number of characters and $\mathbf{\ell}$ the Wronskian index. The modular linear differential equation (MLDE) that the characters of a RCFT solve are labelled similarly. All RCFTs with a given $\mathbf{[n, \ell]}$ solve the modular linear differential equation (MLDE) labelled by the same $\mathbf{[n, \ell]}$. With the goal of classifying $\mathbf{[3,3]}$ and $\mathbf{[3,4]}$ CFTs, we set-up and solve those MLDEs, each of which is a three-parameter non-rigid MLDE, for character-like solutions. In the former case, we obtain four infinite families and a discrete set of $15$ solutions, all in the range $0 < c \leq 32$. Amongst these $\mathbf{[3,3]}$ character-like solutions, we find pairs of them that form coset-bilinear relations with meromorphic CFTs/characters of central charges $16, 24, 32, 40, 48, 56, 64$. There are six families of coset-bilinear relations where both the RCFTs of the pair are drawn from the infinite families of solutions. There are an additional $23$ coset-bilinear relations between character-like solutions of the discrete set. The coset-bilinear relations should help in identifying the $\mathbf{[3,3]}$ CFTs. In the $\mathbf{[3,4]}$ case, we obtain nine character-like solutions each of which is a $\mathbf{[2,2]}$ character-like solution adjoined with a constant character.