Causal spinfoam vertex for 4d Lorentzian quantum gravity
Abstract
We introduce a new causal spinfoam vertex for 4d Lorentzian quantum gravity. The causal data are encoded in Toller T-matrices, which add to Wigner D-matrices T(+)+T(-)=D, and for which we provide a Feynman i representation. We discuss how the Toller poles cancel in the EPRL vertex, how the Livine-Oriti model is obtained in the Barrett-Crane limit, and how spinfoam causal data are distinct from Regge causal data. In the large-spin limit, we show that only Lorentzian Regge geometries with causal data compatible with the spinfoam data are selected, resulting in a single exponential (+i\, SRegge/) and a new form of causal rigidity.
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