Spatial fluctuations of a surviving particle in the trapping reaction

Abstract

We consider the trapping reaction, A+B B, where A and B particles have a diffusive dynamics characterized by diffusion constants DA and DB. The interaction with B particles can be formally incorporated in an effective dynamics for one A particle as was recently shown by Bray et al. [Phys. Rev. E 67, 060102 (2003)]. We use this method to compute, in space dimension d=1, the asymptotic behaviour of the spatial fluctuation, <z2(t)>1/2, for a surviving A particle in the perturbative regime, DA/DB 1, for the case of an initially uniform distribution of B particles. We show that, for t 1, <z2(t)>1/2 tφ with φ=1/4. By contrast, the fluctuations of paths constrained to return to their starting point at time t grow with the larger exponent 1/3. Numerical tests are consistent with these predictions.

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