English

Full absorption statistics of diffusing particles with exclusion

Statistical Mechanics 2015-12-07 v2

Abstract

Suppose that an infinite lattice gas of constant density n0n_0, whose dynamics are described by the symmetric simple exclusion process, is brought in contact with a spherical absorber of radius RR. Employing the macroscopic fluctuation theory and assuming the additivity principle, we evaluate the probability distribution P(N){\mathcal P}(N) that NN particles are absorbed during a long time TT. The limit of N=0N=0 corresponds to the survival problem, whereas NNˉN\gg \bar{N} describes the opposite extreme. Here Nˉ=4πRD0n0T\bar{N}=4\pi R D_0 n_0 T is the \emph{average} number of absorbed particles (in three dimensions), and D0D_0 is the gas diffusivity. For n01n_0\ll 1 the exclusion effects are negligible, and P(N){\mathcal P}(N) can be approximated, for not too large NN, by the Poisson distribution with mean Nˉ\bar{N}. For finite n0n_0, P(N){\mathcal P}(N) is non-Poissonian. We show that lnP(N)n0N2/Nˉ-\ln{\mathcal P}(N) \simeq n_0 N^2/\bar{N} at NNˉN\gg \bar{N}. At sufficiently large NN and n0<1/2n_0<1/2 the most likely density profile of the gas, conditional on the absorption of NN particles, is non-monotonic in space. We also establish a close connection between this problem and that of statistics of current in finite open systems.

Keywords

Cite

@article{arxiv.1412.2211,
  title  = {Full absorption statistics of diffusing particles with exclusion},
  author = {Baruch Meerson},
  journal= {arXiv preprint arXiv:1412.2211},
  year   = {2015}
}

Comments

17 one-column pages, 8 figures, slightly revised version

R2 v1 2026-06-22T07:22:26.434Z