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Probability Distribution Function for the Euclidean Distance Between Two Telegraph Processes

Probability 2014-12-18 v1

Abstract

Consider two independent Goldstein-Kac telegraph processes X1(t)X_1(t) and X2(t)X_2(t) on the real line R\Bbb R. The processes Xk(t),  k=1,2,X_k(t), \; k=1,2, are performed by stochastic motions at finite constant velocities c1>0,  c2>0,c_1>0, \; c_2>0, that start at the initial time instant t=0t=0 from the origin of the real line R\Bbb R and are controlled by two independent homogeneous Poisson processes of rates λ1>0,  λ2>0\lambda_1>0, \; \lambda_2>0, respectively. Closed-form expression for the probability distribution function of the Euclidean distance ρ(t)=X1(t)X2(t),t>0,\rho(t) = |X_1(t) - X_2(t) |, \qquad t>0, between these processes at arbitrary time instant t>0t>0, is obtained. Some numerical results are presented.

Cite

@article{arxiv.1305.6522,
  title  = {Probability Distribution Function for the Euclidean Distance Between Two Telegraph Processes},
  author = {Alexander D. Kolesnik},
  journal= {arXiv preprint arXiv:1305.6522},
  year   = {2014}
}
R2 v1 2026-06-22T00:23:54.637Z