The area of exponential random walk and partial sums of uniform order statistics

Abstract

Let Si be a random walk with standard exponential increments. We call Σi=1k Si its k-step area. The random variable V = ∈fk 1 2k(k+1) Σi=1k Si plays important role in the study of so-called one-dimensional sticky particles model. We find the distribution of V and prove that P(V > t) = 1-t exp(-t/2) for t in [0,1]. We also show that the variables 1 k n 2nk(k+1) Σi=1k Ui, n converge in distribution to V. Here Ui, n are the order statistics of n i.i.d. random variables uniformly distributed on [0,1].

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