Gaussian heat kernel asymptotics for conditioned random walks
Abstract
Consider a random walk Sn=Σi=1n Xi with independent and identically distributed real-valued increments with zero mean, finite variance and moment of order 2 + δ for some δ>0. For any starting point x∈ R, let τx = ∈f \ k≥ 1: x+Sk < 0 \ denote the first time when the random walk x+Sn exits the half-line [0,∞). We investigate the uniform asymptotic behavior over x∈ R of the persistence probability P (τx >n) and the joint distribution P ( x + Sn ≤ u, τx > n ), for u≥ 0, as n ∞. New limit theorems for these probabilities are established based on the heat kernel approximations. Additionally, we evaluate the rate of convergence by proving Berry-Esseen type bounds.
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