Semiclassical Analysis of Spinfoam Model with a Small Barbero-Immirzi Parameter

Abstract

We study the semiclassical behavior of Lorentzian Engle-Pereira-Rovelli-Livine (EPRL) spinfoam model, by taking into account of the sum over spins in the large spin regime. The large spin parameter λ and small Barbero-Immirzi parameter γ are treated as two independent parameters for the asymptotic expansion of spinfoam state-sum (such an idea was firstly pointed out in arXiv:1105.0216). Interestingly, there are two different spin regimes: 1<<γ-1<<λ<<γ-2 and λ>γ-2. The model in two spin regimes has dramatically different number of effective degrees of freedom. In 1<<γ-1<<λ<<γ-2, the model produces in the leading order a functional integration of Regge action, which gives the discrete Einstein equation for the leading contribution. There is no restriction of Lorentzian deficit angle in this regime. In the other regime λ>γ-2, only small deficit angle is allowed |f|<<γ-1λ1/2$ mod 4π Z. When spins go even larger, only zero deficit angle mod 4π Z is allowed asymptotically. In the transition of the two regimes, only the configurations with small deficit angle can contribute, which means one need a large triangulation in order to have oscillatory behavior of the spinfoam amplitude.