Asymptotic of Lorentzian Polyhedra Propagator

Abstract

A certain operator =∫ g\, YgY can be found in various Lorentzian EPRL calculations. The properties of this operator has been studied here in large j limit. The leading order of is proportional to the identity operator. Knowing the operator one can renormalize spin-foam's edge self-energy by computing the amplitude of sum of a series of edges with increasing number of vertices and bubbles. This amplitude is calculated and is shown to be convergent. Moreover some technical tools useful in Lorentzian Spin-Foam calculation has been developed.