Journal article
Modularity of Bershadsky–Polyakov minimal models
Z Fehily, D Ridout
Letters in Mathematical Physics | Published : 2022
Abstract
The Bershadsky–Polyakov algebras are the original examples of nonregular W-algebras, obtained from the affine vertex operator algebras associated with sl3 by quantum Hamiltonian reduction. In Fehily et al. (Comm Math Phys 385:859–904, 2021), we explored the representation theories of the simple quotients of these algebras when the level k is nondegenerate-admissible. Here, we combine these explorations with Adamović’s inverse quantum Hamiltonian reduction functors to study the modular properties of Bershadsky–Polyakov characters and deduce the associated Grothendieck fusion rules. The results are not dissimilar to those already known for the affine vertex operator algebras associated with sl..
View full abstractRelated Projects (2)
Grants
Awarded by Australian Research Council
Funding Acknowledgements
ZF's research is supported by an Australian Government Research Training Program (RTP) Scholarship. DR's research is supported by the Australian Research Council Discovery Projects DP160101520 and DP210101502, as well as an Australian Research Council Future Fellowship FT200100431. On behalf of all authors, the corresponding author states that there is no conflict of interest. Department of Education, Skills and Employment, Australian Government (AU) (361974)