Mixing Time and Cutoff for a Random Walk on the Ring of Integers mod n

Abstract

We analyse a random walk on the ring of integers mod $n$, which at each time point can make an additive `step' or a multiplicative `jump'. When the probability of making a jump tends to zero as an appropriate power of $n$ we prove the existence of a total variation pre-cutoff for this walk. In addition, we show that the process obtained by subsampling our walk at jump times exhibits a true cutoff, with mixing time dependent on whether the step distribution has zero mean.

Metadata

Item Type:	Article
Authors/Creators:	Bate, Michael E. https://orcid.org/0000-0002-6513-2405 Connor, Stephen B. https://orcid.org/0000-0002-9785-2159
Copyright, Publisher and Additional Information:	© 2017 Bernoulli Society. This is an author-produced version of the published paper. Uploaded in accordance with the publisher’s self-archiving policy. Further copying may not be permitted; contact the publisher for details.
Keywords:	math.PR,60J10
Dates:	Published: 2018 Published (online): 16 February 2016 Accepted: 16 February 2016
Institution:	The University of York
Academic Units:	The University of York > Faculty of Sciences (York) > Mathematics (York)
Depositing User:	Pure (York)
Date Deposited:	17 Dec 2015 11:25
Last Modified:	17 Oct 2024 08:31
Status:	Published
Refereed:	Yes
Related URLs:	http://arxiv.org/abs/1407.3580
Open Archives Initiative ID (OAI ID):	oai:eprints.whiterose.ac.uk:79774