Families of Vicious Walkers

Abstract

We consider a generalisation of the vicious walker problem in which N random walkers in Rd are grouped into p families. Using field-theoretic renormalisation group methods we calculate the asymptotic behaviour of the probability that no pairs of walkers from different families have met up to time t. For d>2, this is constant, but for d<2 it decays as a power t(-alpha), which we compute to O(epsilon2) in an expansion in epsilon=2-d. The second order term depends on the ratios of the diffusivities of the different families. In two dimensions, we find a logarithmic decay (ln t)(-alpha'), and compute alpha' exactly.

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