Some exact results for the trapping of subdiffusive particles in one
  dimension

Anlauf; Balakrishnan; Barkai; Beeler; ben-Avraham; Blumen; Bouchaud; Branson; Bray; Bray; Bénichou; Damask; den Hollander; Donsker; Havlin; Klafter; Klemm; Krapivsky; Krapivsky; L Acedo; Mathai; Metzler; Metzler; Miyagawa; Montroll; Nechaev; Odagaki; Oshanin; Oshanin; Podlubny; Rangarajan; Rangarajan; Redner; Romero; Rosenstock; S.B Yuste; Sastry; Sung; Weiss; West; Yuste; Yuste; Yuste; Yuste; Yuste; Zumofen; Zumofen

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Some exact results for the trapping of subdiffusive particles in one dimension

Authors: Anlauf
Balakrishnan
Barkai
Beeler
ben-Avraham
Blumen
Bouchaud
Branson
Bray
Bray
Bénichou
Damask
den Hollander
Donsker
Havlin
Klafter
Klemm
Krapivsky
Krapivsky
L Acedo
Mathai
Metzler
Metzler
Miyagawa
Montroll
Nechaev
Odagaki
Oshanin
Oshanin
Podlubny
Rangarajan
Rangarajan
Redner
Romero
Rosenstock
S.B Yuste
Sastry
Sung
Weiss
West
Yuste
Yuste
Yuste
Yuste
Yuste
Zumofen
Zumofen
Publication date: 10 November 2003
Publisher: 'Elsevier BV'
Doi

Abstract

We study a generalization of the standard trapping problem of random walk theory in which particles move subdiffusively on a one-dimensional lattice. We consider the cases in which the lattice is filled with a one-sided and a two-sided random distribution of static absorbing traps with concentration c. The survival probability Phi(t) that the random walker is not trapped by time t is obtained exactly in both versions of the problem through a fractional diffusion approach. Comparison with simulation results is madeComment: 15 pages, 2 figure

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