A unitary vertex operator algebra arising from the 3C-algebra

Abstract: We prove that the vertex operator algebra $L(21/22, 0)\oplus L(21/22, 8)$ is unitary and all its irreducible modules are unitary modules. Moreover, using results from modular tensor categories, we establish a general result about fusion rules for commutant subalgebras under suitable assumptions. As an application, we explicitly determine the fusion rules of all irreducible $L(21/22, 0)\oplus L(21/22, 8)$-modules.