Brownian Motion in wedges, last passage time and the second arc-sine law
Abstract
We consider a planar Brownian motion starting from O at time t=0 and stopped at t=1 and a set F= \OIi ; i=1,2,..., n\ of n semi-infinite straight lines emanating from O. Denoting by g the last time when F is reached by the Brownian motion, we compute the probability law of g. In particular, we show that, for a symmetric F and even n values, this law can be expressed as a sum of or ()2 functions. The original result of Levy is recovered as the special case n=2. A relation with the problem of reaction-diffusion of a set of three particles in one dimension is discussed.
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