Number of distinct and common sites visited by N independent random walkers

Abstract

In this Chapter, we consider a model of N independent random walkers, each of duration t, and each starting from the origin, on a lattice in d dimensions. We focus on two observables, namely DN(t) and CN(t) denoting respectively the number of distinct and common sites visited by the walkers. For large t, where the lattice random walkers converge to independent Brownian motions, we compute exactly the mean DN(t) and CN(t) . Our main interest is on the N-dependence of these quantities. While for DN(t) the N-dependence only appears in the prefactor of the power-law growth with time, a more interesting behavior emerges for CN(t) . For this latter case, we show that there is a ``phase transition'' in the (N, d) plane where the two critical line d=2 and d=dc(N) = 2N/(N-1) separate three phases of the growth of CN(t). The results are extended to the mean number of sites visited exactly by K of the N walkers. Furthermore in d=1, the full distribution of DN(t) and CN(t) are computed, exploiting a mapping to the extreme value statistics. Extensions to two other models, namely N independent Brownian bridges and N independent resetting Brownian motions/bridges are also discussed.

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