Free geometric equations for higher spins
Abstract
We show how allowing non-local terms in the field equations of symmetric tensors uncovers a neat geometry that naturally generalizes the Maxwell and Einstein cases. The end results can be related to multiple traces of the generalized Riemann curvatures Ralpha1 ... alphas; beta1 > ... betas introduced by de Wit and Freedman, divided by suitable powers of the D'Alembertian operator . The conventional local equations can be recovered by a partial gauge fixing involving the trace of the gauge parameters Lambdaalpha1 ... alphas-1, absent in the Fronsdal formulation. The same geometry underlies the fermionic equations, that, for all spins s+(1/2), can be linked via the operator (not hskip 1pt pr)/() to those of the spin-s bosons.
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