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Massless finite and infinite spin representations of Poincaré group in six dimensions

We study the massless irreducible representations of the Poincaré group in the six-dimensional Minkowski space. The Casimir operators are constructed and their eigenvalues are found. It is shown that the finite spin (helicity) representation is defined by two integer or half-integer numbers while the infinite spin representation is defined by the real parameter $μ^2$ and one integer or half-integer number.

preprint2021arXivOpen access
I. L. BuchbinderS. A. FedorukA. P. IsaevM. A. Podoinitsyn
math-phmath.MPhep-th
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I. L. BuchbinderS. A. FedorukA. P. IsaevM. A. Podoinitsyn

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