A non-local random walk on the hypercube-Reference-Cited by-同舟云学术

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A non-local random walk on the hypercube

Published:2017-11-17 Issue:4 Volume:49 Page:1288-1299
ISSN:0001-8678
Container-title:Advances in Applied Probability
language:en
Short-container-title:Adv. Appl. Probab.

Author:

Nestoridi Evita

Abstract

Abstract In this paper we study the random walk on the hypercube (ℤ / 2ℤ)n which at each step flips k randomly chosen coordinates. We prove that the mixing time for this walk is of the order (n / k)logn. We also prove that if k = o(n) then the walk exhibits cutoff at (n / 2k)logn with window n / 2k.

Publisher

Cambridge University Press (CUP)

Subject

Applied Mathematics,Statistics and Probability

Reference16 articles.

1. Path coupling: A technique for proving rapid mixing in Markov chains

2. Asymptotic analysis of a random walk on a hypercube with many dimensions

3. Sinclair A. (2009). Markov chain Monte Carlo: foundations & applications. Available at https://people.eecs.berkeley.edu/~sinclair/cs294/f09.html.

4. Time to Reach Stationarity in the Bernoulli–Laplace Diffusion Model

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1. Mixing time bounds for edge flipping on regular graphs;Journal of Applied Probability;2023-04-26

2. A Class of Random Walks on the Hypercube;Progress in Probability;2020-11-04

3. A spectral decomposition for a simple mutation model;Electronic Communications in Probability;2019-01-01

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