Novel possible symmetries of S-matrix generated by Z2n-graded Lie superalgebras
Abstract
In this paper, we explore the Z2n-graded Lie (super)algebras as novel possible generators of symmetries of S-matrix. As the results, we demonstrate that a Z2n-graded extension of the supersymmetric algebra can be a symmetry of S-matrix. Furthermore, it turns out that a Z2n-graded Lie algebra appears as internal symmetries. They are natural extensions of Coleman-Mandula theorem and Haag-Lopszanski-Sohnius theorem, which are the no-go theorems for generators of symmetries of S-matrix.
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