📝 SummarXiv

Abstract

In this paper, we undertake a systematic study of the parabolic-type sub-vertex operator algebras (VOAs) \(V_P\) of rank-two lattice VOAs \(V_L\), originally introduced by the first-named author. We first classify all possible types of such subVOAs by analyzing the corresponding submonoids \(P \subseteq L\). For each type of \(V_P\), we then classify the irreducible modules and determine the fusion rules among them. Finally, we show that the simple quotient \(V_H\) of any parabolic-type subVOA \(V_P\) is a \(C_1\)-cofinite, irrational VOA satisfying the strongly unital property recently introduced by Damiolini--Gibney--Krashen.