Gauging Discrete Symmetries of TN-theories in Five Dimensions
Abstract
We study the gauging of a discrete Z3 symmetry in the five-dimensional superconformal TN theories. We argue that this leads to an infinite sequence of five-dimensional superconformal theories with either E6 × SU(N) or SU(3)× SU(N) global symmetry group. In the M-theory realisation of TN theories as residing at the origin in the Calabi-Yau orbifolds C3 ZN × ZN we identify the Z3 symmetry geometrically and the new theories arise from M-theory on the non-Abelian orbifolds (C3 ZN × ZN)/Z3. On the other hand, in the (p,q) 5-brane web description in Type IIB theory, the symmetry combines the U-duality symmetry with a rotation in space, defining a so-called U-fold background, where the E6 symmetry is manifest.
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