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Abstract.

The problem of the Laplacian transfer across an irregular resistive interface (a membrane or an electrode) is investigated with use of the Brownian self-transport operator. This operator describes the transfer probability between two points of a surface, through Brownian motion in the medium neighbouring the surface. This operator governs the flux across a semi-permeable membrane as diffusing particles repetitively hit the surface until they are finally absorbed. In this paper, we first give a theoretical study of the properties of this operator for a planar membrane. It is found that the net effect of a decrease of the surface permeability is to induce a broadening of the region where a particle, first hitting the surface on one point, is finally absorbed. This result constitutes the first analytical justification of the Land Surveyor Approximation, a formerly developed method used to compute the overall impedance of a semi-permeable membrane. In a second step, we study numerically the properties of the Brownian self-transport operator for selected irregular shapes.

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Correspondence to D. S. Grebenkov.

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Received: 17 June 2003, Published online: 8 December 2003

PACS:

41.20.Cv Laplace equation - 82.65.Jv Heterogeneous catalysis - 61.43.Hv Fractals

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Grebenkov, D.S., Filoche, M. & Sapoval, B. Spectral properties of the Brownian self-transport operator. Eur. Phys. J. B 36, 221–231 (2003). https://doi.org/10.1140/epjb/e2003-00339-4

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  • DOI: https://doi.org/10.1140/epjb/e2003-00339-4

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