Ordering statistics of 4 random walkers on the line

Abstract

We study the ordering statistics of 4 random walkers on the line, obtaining a much improved estimate for the long-time decay exponent of the probability that a particle leads to time t; P lead(t) t-0.91287850, and that a particle lags to time t (never assumes the lead); P lag(t) t-0.30763604. Exponents of several other ordering statistics for N=4 walkers are obtained to 8 digits accuracy as well. The subtle correlations between n walkers that lag jointly, out of a field of N, are discussed: For N=3 there are no correlations and P lead(t) P lag(t)2. In contrast, our results rule out the possibility that P lead(t) P lag(t)3 for N=4, though the correlations in this borderline case are tiny.