Non-invertible higher-categorical symmetries

We sketch a procedure to capture general non-invertible symmetries of a dd-dimensional quantum field theory in the data of a higher-category, which captures the local properties of topological defects associated to the symmetries. We also discuss fusions of topological defects, which involve condensations/gaugings of higher-categorical symmetries localized on the worldvolumes of topological defects. Recently some fusions of topological defects were discussed in the literature where the dimension of topological defects seems to jump under fusion. This is not possible in the standard description of higher-categories. We explain that the dimension-changing fusions are understood as higher-morphisms of the higher-category describing the symmetry. We also discuss how a 0-form sub-symmetry of a higher-categorical symmetry can be gauged and describe the higher-categorical symmetry of the theory obtained after gauging. This provides a procedure for constructing non-invertible higher-categorical symmetries starting from invertible higher-form or higher-group symmetries and gauging a 0-form symmetry. We illustrate this procedure by constructing non-invertible 2-categorical symmetries in 4d gauge theories and non-invertible 3-categorical symmetries in 5d and 6d theories. We check some of the results obtained using our approach against the results obtained using a recently proposed approach based on ’t Hooft anomalies.

[1]  S. Schäfer-Nameki,et al.  Universal Non‐Invertible Symmetries , 2022, Fortschritte der Physik.

[2]  Ling Lin,et al.  Decomposition, Condensation Defects, and Fusion , 2022, Fortschritte der Physik.

[3]  T. Johnson-Freyd On the Classification of Topological Orders , 2020, Communications in Mathematical Physics.

[4]  Ying-Hsuan Lin,et al.  Duality defect of the monster CFT , 2019, Journal of Physics A: Mathematical and Theoretical.

[5]  OUP accepted manuscript , 2021, Progress of Theoretical and Experimental Physics.

[6]  A. Pini,et al.  Gauge theories from principally extended disconnected gauge groups , 2018, Nuclear Physics B.

[7]  Gregor Schaumann,et al.  Orbifolds of n–dimensional defect TQFTs , 2017, Geometry & Topology.

[8]  E. Sharpe Notes on generalized global symmetries in QFT , 2015, 1508.04770.

[9]  E. Fradkin,et al.  Theory of Twist Liquids: Gauging an Anyonic Symmetry , 2015, 1503.06812.

[10]  Daniel S. Park,et al.  On the Defect Group of a 6D SCFT , 2015, 1503.04806.

[11]  J. Fuchs,et al.  DEFECT LINES, DUALITIES AND GENERALISED ORBIFOLDS , 2009, 0909.5013.

[12]  J. Fuchs,et al.  Topological defects for the free boson CFT , 2007, 0705.3129.

[13]  D. Freed,et al.  Heisenberg groups and noncommutative fluxes , 2006, hep-th/0605200.

[14]  C. Bachas,et al.  Loop operators and the Kondo problem , 2004, hep-th/0411067.

[15]  D. Tambara,et al.  Tensor Categories with Fusion Rules of Self-Duality for Finite Abelian Groups , 1998 .

[16]  E. Verlinde,et al.  Fusion Rules and Modular Transformations in 2D Conformal Field Theory , 1988 .