Ribbon tensor structure on the full representation categories of the singlet vertex algebras

Abstract: We show that the category of finite-length generalized modules for the singlet vertex algebra M(p), p ∈ Z>1, is equal to the category O M(p) of C1-cofinite M(p)modules, and that this category admits the vertex algebraic braided tensor category structure of Huang-Lepowsky-Zhang. Since O M(p) includes the uncountably many typical M(p)-modules, which are simple M(p)-module structures on Heisenberg Fock modules, our results substantially extend our previous work on tensor categories of atypical M(p)modules. We als… Show more

“…For these levels, the classification given by our two main results is new. When v = 3, hence k = − 7 3 , we can make this classification explicit because W 3,k then coincides with the singlet algebra [44] of central charge c = −2 whose representation theory is well understood, see [1,22,23,27,39,61]. When v > 3, it remains an open problem to make the classification explicit.…”

Weight module classifications for Bershadsky--Polyakov algebras

“…For these levels, the classification given by our two main results is new. When v = 3, hence k = − 7 3 , we can make this classification explicit because W 3,k then coincides with the singlet algebra [44] of central charge c = −2 whose representation theory is well understood, see [1,22,23,27,39,61]. When v > 3, it remains an open problem to make the classification explicit.…”

Weight module classifications for Bershadsky--Polyakov algebras