Skip to content
Back Home
Simons Collaboration on Global Categorical Symmetries
  • Home
  • People
  • Events
  • Positions
  • Resources
  • Publications
  • Chrysalis
  • Search
Back Home
Simons Collaboration on Global Categorical Symmetries
  • Search
  • Home
  • People
  • Events
  • Positions
  • Resources
  • Publications
  • Chrysalis
Home » Global-Categorical-Symmetries-Confinement » Publications » Fusion Category Symmetry II: Categoriosities at c = 1 and Beyond
Publications

Fusion Category Symmetry II: Categoriosities at c = 1 and Beyond

by djordan|Published August 20, 2021

Thorngren and Wang. https://arxiv.org/abs/2106.12577

You may also like

Non-invertible Condensation, Duality, and Triality Defects in 3+1 Dimensions
Published May 18, 2022

Non-invertible Condensation, Duality, and Triality Defects in 3+1 Dimensions

Choi, Córdova, Hsin, Lam, Shao, https://arxiv.org/abs/2204.09025

Zesting produces modular isotopes and explains their topological invariants
Published September 2, 2021

Zesting produces modular isotopes and explains their topological invariants

Delaney, Kim, Plavnik. https://arxiv.org/abs/2107.11374

On the 6d Origin of Non-invertible Symmetries in 4d
Published October 31, 2022

On the 6d Origin of Non-invertible Symmetries in 4d

Bashmakov, Del Zotto, Hasan, https://arxiv.org/abs/2206.07073

Matching higher symmetries across Intriligator-Seiberg duality,
Published August 20, 2021

Matching higher symmetries across Intriligator-Seiberg duality,

Lee, Ohmori, Tachikawa. https://arxiv.org/abs/2108.05369

Post navigation

  • Previous post Matching higher symmetries across Intriligator-Seiberg duality,
  • Back to post list
  • Next post Claudia Scheimbauer on “Dualizabitility, higher categories, and topological field theories”

© 2025 Simons Collaboration on Global Categorical Symmetries – All rights reserved

Powered by WP – Designed with the Customizr theme