Increasing subsequences of random walks
Abstract
Given a sequence of real numbers , we consider the longest weakly increasing subsequence, namely with and maximal. When the elements are i.i.d. uniform random variables, Vershik and Kerov, and Logan and Shepp proved that . We consider the case when is a random walk on with increments of mean zero and finite (positive) variance. In this case, it is well known (e.g., using record times) that the length of the longest increasing subsequence satisfies . Our main result is an upper bound , establishing the leading asymptotic behavior. If is a simple random walk on , we improve the lower bound by showing that . We also show that if is a simple random walk in , then there is a subsequence of of expected length at least that is increasing in each coordinate. The above one-dimensional result yields an upper bound of . The problem of determining the correct exponent remains open.
Cite
@article{arxiv.1407.2860,
title = {Increasing subsequences of random walks},
author = {Omer Angel and Richárd Balka and Yuval Peres},
journal= {arXiv preprint arXiv:1407.2860},
year = {2016}
}
Comments
18 pages, 2 figures