On some vertex algebras related to V-1(sl (n) ) and their characters

Abstract

We consider several vertex operator (super)algebras closely related to V-1(sl (n) ), n 3 : (a) the parafermionic subalgebra K(sl(n),-1) for which we completely describe its inner structure, (b) the vacuum algebra (V-1(sl (n) ) ), and (c) an infinite extension U of V-1(sl (n) ) constructed by combining certain irreducible ordinary modules with integral weights. It turns out that U is isomorphic to the coset vertex algebra psl(n|n) 1 / sl(n)1, n 3. We show that V-1(sl(n)) admits precisely n ordinary irreducible modules, up to isomorphism. This leads to the conjecture that U is quasi-lisse. We present evidence in support of this conjecture: we prove that the (super)character of U is quasi-modular of weight one by virtue of being the constant term of a meromorphic Jacobi form of index zero. Explicit formulas and MLDE for characters and supercharacters are given for g=sl(3) and outlined for general n. We present a conjectural family of 2nd order MLDEs for characters of vertex algebras psl(n|n) 1, n ≥ 2. We finish with a theorem pertaining to characters of psl(n|n)1 and U-modules.