(-1)-form symmetries from M-theory and SymTFTs
Abstract
We explore (-1)-form symmetries within the framework of geometric engineering in M-theory. By constructing the Symmetry Topological Field Theory (SymTFT) for selected 5d N=1, 4d N=2 and 4d N=1 theories, we formalize the geometric origin of these symmetries and compute the mixed anomaly polynomials involving (-1)-form and higher-form symmetries. Our findings consistently reveal both discrete and continuous (-1)-form symmetries, aligning with established field theory results, while also uncovering new (-1)-form symmetry factors and structural insights. In particular, we study the SymTFT of 4d N=1 theories from M-theory on a class of spaces with G2 holonomy, and obtain properties such as modified instanton sums and 4-group structures observed in other 4d gauge theories. Additionally, we systematically construct symmetry operators for continuous abelian symmetries, refining existing proposals, and providing an M-theory origin for them.
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