Local convergence in t-PNG
Abstract
We prove local convergence of the t-PNG model with zero boundary to the stationary t-PNG model, confirming a recent conjecture of Drillick and Lin (2024). The stationary t-PNG model is the one with both left and bottom boundaries of Poisson nucleations with rate parameters 1λ(1-t) and λ, respectively, for some λ>0. In the proof, we consider the trajectories of certain second class particles via a basic monotone coupling of three t-PNG processes, and adapt microscopic concavity ideas used in particle models (e.g., Bal\'azs and Sepp\"al\"ainen (2009)), as well as blocking measure bounds like in Ferrari, Kipnis and Saada (1991).
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