Exact Statistics of the Gap and Time Interval Between the First Two Maxima of Random Walks

Abstract

We investigate the statistics of the gap, Gn, between the two rightmost positions of a Markovian one-dimensional random walker (RW) after n time steps and of the duration, Ln, which separates the occurrence of these two extremal positions. The distribution of the jumps ηi's of the RW, f(η), is symmetric and its Fourier transform has the small k behavior 1-f(k)| k|μ with 0 < μ ≤ 2. We compute the joint probability density function (pdf) Pn(g,l) of Gn and Ln and show that, when n ∞, it approaches a limiting pdf p(g,l). The corresponding marginal pdf of the gap, p gap(g), is found to behave like p gap(g) g-1 - μ for g 1 and 0<μ < 2. We show that the limiting marginal distribution of Ln, p time(l), has an algebraic tail p time(l) l-γ(μ) for l 1 with γ(1<μ ≤ 2) = 1 + 1/μ, and γ(0<μ<1) = 2. For l, g 1 with fixed l g-μ, p(g,l) takes the scaling form p(g,l) g-1-2μ pμ(l g-μ) where pμ(y) is a (μ-dependent) scaling function. We also present numerical simulations which verify our analytic results.