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When are Duality Defects Group-Theoretical?

High Energy Physics - Theory 2025-03-24 v2

Abstract

A quantum field theory with a finite abelian symmetry GG may be equipped with a non-invertible duality defect associated with gauging GG. For certain GG, duality defects admit an alternative construction where one starts with invertible symmetries with certain 't Hooft anomaly, and gauging a non-anomalous subgroup. This special type of duality defects are termed group theoretical. In this work, we determine when duality defects are group theoretical, among G=ZN(0)G=\mathbb{Z}_N^{(0)} and ZN(1)\mathbb{Z}_N^{(1)} in 22d and 4d quantum field theories, respectively. A duality defect is group theoretical if and only if its Symmetry TFT is a Dijkgraaf-Witten theory, and we argue that this is equivalent to a certain stability condition of the topological boundary conditions of the GG gauge theory. By solving the stability condition, we find that a ZN(0)\mathbb{Z}_N^{(0)} duality defect in 2d is group theoretical if and only if NN is a perfect square, and under certain assumptions a ZN(1)\mathbb{Z}_N^{(1)} duality defect in 4d is group theoretical if and only if N=L2MN=L^2 M where 1-1 is a quadratic residue of MM. For these subset of NN, we construct explicit topological manipulations that map the non-invertible duality defects to invertible defects. We also comment on the connection between our results and the recent discussion of obstruction to duality-preserving gapped phases.

Keywords

Cite

@article{arxiv.2307.14428,
  title  = {When are Duality Defects Group-Theoretical?},
  author = {Zhengdi Sun and Yunqin Zheng},
  journal= {arXiv preprint arXiv:2307.14428},
  year   = {2025}
}

Comments

35 pages

R2 v1 2026-06-28T11:41:04.907Z