Random walk generated by random permutations of 1,2,3, ..., n+1
Abstract
We study properties of a non-Markovian random walk X(n)l, l =0,1,2, >...,n, evolving in discrete time l on a one-dimensional lattice of integers, whose moves to the right or to the left are prescribed by the rise-and-descent sequences characterizing random permutations π of [n+1] = \1,2,3, ...,n+1\. We determine exactly the probability of finding the end-point Xn = X(n)n of the trajectory of such a permutation-generated random walk (PGRW) at site X, and show that in the limit n ∞ it converges to a normal distribution with a smaller, compared to the conventional P\'olya random walk, diffusion coefficient. We formulate, as well, an auxiliary stochastic process whose distribution is identic to the distribution of the intermediate points X(n)l, l < n, which enables us to obtain the probability measure of different excursions and to define the asymptotic distribution of the number of "turns" of the PGRW trajectories.
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