Tensor categories of weight modules of sl2 at admissible level
Abstract
The category of weight modules Lk(sl2)-wtmod of the simple affine vertex algebra of sl2 at an admissible level k is neither finite nor semisimple and modules are usually not lower-bounded and have infinite dimensional conformal weight subspaces. However this vertex algebra enjoys a duality with W(sl2|1), the simple prinicipal W-algebra of sl2|1 at level (the N=2 super conformal algebra) where the levels are related via (k+2)(+1)=1. Every weight module of W(sl2|1) is lower-bounded and has finite-dimensional conformal weight spaces. The main technical result is that every weight module of W(sl2|1) is C1-cofinite. The existence of a vertex tensor category follows and the theory of vertex superalgebra extensions implies the existence of vertex tensor category structure on Lk(sl2)-wtmod for any admissible level k. As applications, the fusion rules of ordinary modules with any weight module are computed and it is shown that Lk(sl2)-wtmod is a ribbon category if and only if Lk+1(sl2)-wtmod is, in particular it follows that for admissible levels k = - 2 + uv and v ∈ \2, 3\ and u = -1 v the category Lk(sl2)-wtmod is a ribbon category.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.