English

Dichotomous acceleration process in one dimension: Position fluctuations

Statistical Mechanics 2023-08-22 v2 Mathematical Physics math.MP

Abstract

We study the motion of a one-dimensional particle which reverses its direction of acceleration stochastically. We focus on two contrasting scenarios, where the waiting-times between two consecutive acceleration reversals are drawn from (i) an exponential distribution and (ii) a power-law distribution ρ(τ)τ(1+α)\rho(\tau)\sim \tau^{-(1+\alpha)}. We compute the mean, variance and short-time distribution of the position x(t)x(t) using a trajectory-based approach. We show that, while for the exponential waiting-time, x2(t)t3\langle x^2(t)\rangle\sim t^3 at long times, for the power-law case, a non-trivial algebraic growth x2(t)t2ϕ(α)\langle x^2(t)\rangle \sim t^{2\phi(\alpha)} emerges, where ϕ(α)=2\phi(\alpha)=2, (5α)/2,(5-\alpha)/2, and 3/23/2 for α<1, 1<α2\alpha<1,~1<\alpha\leq 2 and α>2\alpha>2, respectively. Interestingly, we find that the long-time position distribution in case (ii) is a function of the scaled variable x/tϕ(α)x/t^{\phi(\alpha)} with an α\alpha-dependent scaling function, which has qualitatively very different shapes for α<1\alpha<1 and α>1\alpha>1. In contrast, for case (i), the typical long-time fluctuations of position are Gaussian.

Keywords

Cite

@article{arxiv.2304.11378,
  title  = {Dichotomous acceleration process in one dimension: Position fluctuations},
  author = {Ion Santra and Durgesh Ajgaonkar and Urna Basu},
  journal= {arXiv preprint arXiv:2304.11378},
  year   = {2023}
}

Comments

25 pages

R2 v1 2026-06-28T10:14:28.448Z