Life and Death at the Edge of a Windy Cliff

Abstract

The survival probability of a particle diffusing in the two dimensional domain x>0 near a ``windy cliff'' at x=0 is investigated. The particle dies upon reaching the edge of the cliff. In addition to diffusion, the particle is influenced by a steady ``wind shear'' with velocity v(x,y)=v\, sign(y)\, x, , no average bias either toward or away from the cliff. For this semi-infinite system, the particle survival probability decays with time as t-1/4, compared to t-1/2 in the absence of wind. Scaling descriptions are developed to elucidate this behavior, as well as the survival probability within a semi-infinite strip of finite width |y|<w with particle absorption at x=0. The behavior in the strip geometry can be described in terms of Taylor diffusion, an approach which accounts for the crossover to the t-1/4 decay when the width of the strip diverges. Supporting numerical simulations of our analytical results are presented.

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