Affine vertex operator superalgebra Lsl(2|1)(k,0) at boundary admissible level

Abstract

Let Lsl(2|1)(k,0) be the simple affine vertex operator superalgebra associated to the affine Lie superalgebra sl(2|1) with admissible level k. We conjecture that Lsl(2|1)(k,0) is rational in the category O at boundary admissible level k and there are finitely many irreducible weak Lsl(2|1)(k,0)-modules in the category O, where the irreducible modules are exactly the admissible modules of level k for sl(2|1). In this paper, we first prove this conjecture at boundary admissible level -12. Then we give an example to show that outside of the boudary levels, Lsl(2|1)(k,0) is not rational in the category O. Furthermore, we consider the Q-graded vertex operator superalgebras (Lsl(2|1)(k,0),ω) associated to a family of new Virasoro elements ω, where 0<<1 is a rational number. We determine the Zhu's algebra Aω(Lsl(2|1)(-12,0)) of (Lsl(2|1)(-12,0),ω) and prove that (Lsl(2|1)(-12,0),ω) is rational and C2-cofinite. Finally, we consider the case of non-boundary admissible level 12 to support our conjecture, that is, we show that there are infinitely many irreducible weak Lsl(2|1)(12,0)-modules in the category O and (Lsl(2|1)(12,0),ω) is not rational.

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