We study generalizations of the non-invertible duality defects present in N = 4 SU(N) SYM by studying theories with larger duality groups. We focus on 4d N = 2 theories of class S obtained by the dimensional reduction of the 6d N = (2, 0) theory of A N-1 type on a Riemann surface sigma g without punctures. We discuss their non-invertible duality symmetries and provide two ways to compute their fusion algebra: either using discrete topological manipulations or a 5d TQFT description. We also introduce the concept of "rank" of a non-invertible duality symmetry and show how it can be used to (almost) completely fix the fusion algebra with little computational effort.
“Zoology” of non-invertible duality defects: the view from class S / Antinucci, Andrea; Copetti, Christian; Galati, Giovanni; Rizi, Giovanni. - In: JOURNAL OF HIGH ENERGY PHYSICS. - ISSN 1029-8479. - 2024:4(2024), pp. 1-44. [10.1007/jhep04(2024)036]
“Zoology” of non-invertible duality defects: the view from class S
Antinucci, Andrea;Copetti, Christian;Galati, Giovanni;Rizi, Giovanni
2024-01-01
Abstract
We study generalizations of the non-invertible duality defects present in N = 4 SU(N) SYM by studying theories with larger duality groups. We focus on 4d N = 2 theories of class S obtained by the dimensional reduction of the 6d N = (2, 0) theory of A N-1 type on a Riemann surface sigma g without punctures. We discuss their non-invertible duality symmetries and provide two ways to compute their fusion algebra: either using discrete topological manipulations or a 5d TQFT description. We also introduce the concept of "rank" of a non-invertible duality symmetry and show how it can be used to (almost) completely fix the fusion algebra with little computational effort.| File | Dimensione | Formato | |
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