English

Multiparticle trapping problem in the half-line

Statistical Mechanics 2015-06-24 v1

Abstract

A variation of Rosenstock's trapping model in which NN independent random walkers are all initially placed upon a site of a one-dimensional lattice in the presence of a {\em one-sided} random distribution (with probability cc) of absorbing traps is investigated. The probability (survival probability) ΦN(t)\Phi_N(t) that no random walker is trapped by time tt for N1N \gg 1 is calculated by using the extended Rosenstock approximation. This requires the evaluation of the moments of the number SN(t)S_N(t) of distinct sites visited in a {\em given} direction up to time tt by NN independent random walkers. The Rosenstock approximation improves when NN increases, working well in the range Dtln2(1c)lnNDt\ln^2(1-c) \ll \ln N, DD being the diffusion constant. The moments of the time (lifetime) before any trapping event occurs are calculated asymptotically, too. The agreement with numerical results is excellent.

Keywords

Cite

@article{arxiv.cond-mat/0105375,
  title  = {Multiparticle trapping problem in the half-line},
  author = {S. B. Yuste and L. Acedo},
  journal= {arXiv preprint arXiv:cond-mat/0105375},
  year   = {2015}
}

Comments

11 pages (RevTex), 6 figures (eps). To be published in Physica A