On the Gap and Time Interval between the First Two Maxima of Long Continuous Time Random Walks

Abstract

We consider a one-dimensional continuous time random walk (CTRW) on a fixed time interval T where at each time step the walker waits a random time τ, before performing a jump drawn from a symmetric continuous probability distribution function (PDF) f(η), of L\'evy index 0 < μ ≤ 2. Our study includes the case where the waiting time PDF (τ) has a power law tail, (τ) τ-1 - γ, with 0< γ < 1, such that the average time between two consecutive jumps is infinite. The random motion is sub-diffusive if γ < μ/2 (and super-diffusive if γ > μ/2). We investigate the joint PDF of the gap g between the first two highest positions of the CTRW and the time t separating these two maxima. We show that this PDF reaches a stationary limiting joint distribution p(g,t) in the limit of long CTRW, T ∞. Our exact analytical results show a very rich behavior of this joint PDF in the (γ, μ) plane, which we study in great detail. Our main results are verified by numerical simulations. This work provides a non trivial extension to CTRWs of the recent study in the discrete time setting by Majumdar et al. (J. Stat. Mech. P09013, 2014).