Duality Defects in $E_8$
Abstract
We classify all non-invertible Kramers-Wannier duality defects in the lattice Vertex Operator Algebra (i.e. the chiral WZW model) coming from symmetries. We illustrate how these defects are systematically obtainable as twists of invariant sub-VOAs, compute defect partition functions for small , and verify our results against other techniques. Throughout, we focus on taking a physical perspective and highlight the important moving pieces involved in the calculations. Kac's theorem for finite automorphisms of Lie algebras and contemporary results on holomorphic VOAs play a role. We also provide a perspective from the point of view of (2+1)d Topological Field Theory and provide a rigorous proof that all corresponding Tambara-Yamagami actions on holomorphic VOAs can be obtained in this manner. We include a list of directions for future studies.
Keywords
Cite
@article{arxiv.2112.14323,
title = {Duality Defects in $E_8$},
author = {I. M. Burbano and Justin Kulp and Jonas Neuser},
journal= {arXiv preprint arXiv:2112.14323},
year = {2022}
}
Comments
51+15 pages, 7 figures, 8 tables