Random patterns generated by random permutations of natural numbers
Abstract
We survey recent results on some one- and two-dimensional patterns generated by random permutations of natural numbers. In the first part, we discuss properties of random walks, evolving on a one-dimensional regular lattice in discrete time , whose moves to the right or to the left are induced by the rise-and-descent sequence associated with a given random permutation. We determine exactly the probability of finding the trajectory of such a permutation-generated random walk at site at time , obtain the probability measure of different excursions and define the asymptotic distribution of the number of "U-turns" of the trajectories - permutation "peaks" and "through". In the second part, we focus on some statistical properties of surfaces obtained by randomly placing natural numbers on sites of a 1d or 2d square lattices containing sites. We calculate the distribution function of the number of local "peaks" - sites the number at which is larger than the numbers appearing at nearest-neighboring sites - and discuss some surprising collective behavior emerging in this model.
Cite
@article{arxiv.cond-mat/0609718,
title = {Random patterns generated by random permutations of natural numbers},
author = {G. Oshanin and R. Voituriez and S. Nechaev and O. Vasilyev and F. Hivert},
journal= {arXiv preprint arXiv:cond-mat/0609718},
year = {2009}
}
Comments
16 pages, 5 figures; submitted to European Physical Journal, proceedings of the conference "Stochastic and Complex Systems: New Trends and Expectations" Santander, Spain