A note on weak convergence results for uniform infinite causal triangulations

Details A note on weak convergence results for uniform infinite causal triangulations A note on weak convergence results for uniform infinite causal triangulations

2011-12-31

arxiv.org/abs/1201.0264v1

Physics

Mathematical Physics

23 pages, 2 figures

Scientific paper

We discuss uniform infinite causal triangulations and equivalence to the size biased branching process measure - the critical Galton-Watson branching process distribution conditioned on non-extinction. Using known results from the theory of branching processes, this relation is used to prove weak convergence of the joint length-area process of a uniform infinite causal triangulations to a limiting diffusion. The diffusion equation enables us to determine the physical Hamiltonian and Green's function from the Feynman-Kac procedure, providing us with a mathematical rigorous proof of certain scaling limits of causal dynamical triangulations.

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