Modified instanton sum and 4-group structure in 4d N=1 SU(M) SYM from holography
Abstract
We study the decomposition of the holographic 4d N=1 SU(M) gauge theory with in the Klebanov-Strassler set-up. In particular, we propose a consistent framework for defining a modified instanton sum and a 4-group structure for the SYM theory, derived from its AdS/CFT construction. To achieve this, we analyse symmetry topological operators associated with continuous (-1)-form symmetries, derive the corresponding 5-dimensional Symmetry Topological Field Theory (SymTFT), and impose specific discrete gaugings.
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