A new quasi-lisse affine vertex algebra of type D4
Abstract
We consider a family of potential quasi-lisse affine vertex algebras Lkm(D4) at levels km =-6 + 42m+1. In the case m=0, the irreducible Lk0(D4)--modules were classified in arXiv:1205.3003, and it was proved in arXiv:1610.05865 that Lk0(D4) is a quasi-lisse vertex algebra. We conjecture that Lkm(D4) is quasi-lisse for every m ∈ Z>0, and that it contains a unique irreducible ordinary module. In this article we prove this conjecture for m=1, by using mostly computational methods. We show that the maximal ideal in the universal affine vertex algebra Vk1(D4) is generated by three singular vectors of conformal weight six. The explicit formulas were obtained using software. Then we apply Zhu's theory and classify all irreducible Lk1(D4)--modules. It turns out that Lk1(D4) has 405 irreducible modules in the category O, but a unique irreducible ordinary module. Finally, we prove that Lk1(D4) is quasi-lisse by showing that its associated variety is contained in the nilpotent cone of D4. We also prove that the associated variety XLk1(D4) is Osreg, the Zariski closure of the subregular nilpotent orbit in D4.
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.