On Lerch's transcendent and the Gaussian random walk

Abstract

Let X1,X2,... be independent variables, each having a normal distribution with negative mean -β<0 and variance 1. We consider the partial sums Sn=X1+...+Xn, with S0=0, and refer to the process \Sn:n≥0\ as the Gaussian random walk. We present explicit expressions for the mean and variance of the maximum M=\Sn:n≥0\. These expressions are in terms of Taylor series about β=0 with coefficients that involve the Riemann zeta function. Our results extend Kingman's first-order approximation [Proc. Symp. on Congestion Theory (1965) 137--169] of the mean for β0. We build upon the work of Chang and Peres [Ann. Probab. 25 (1997) 787--802], and use Bateman's formulas on Lerch's transcendent and Euler--Maclaurin summation as key ingredients.

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