Abstract
We consider dynamic random walks where the nearest neighbour jump rates are determined by an underlying supercritical contact process in equilibrium. This has previously been studied by den Hollander and dos Santos (arXiv: 1209.1511). We show the CLT for such a random walk, valid for all supercritical infection rates for the contact process environment.
Details
Title
Random walks generated by equilibrium contact processes
Author(s)
Mountford, Thomas ; Vares, Maria E.
Published in
Electronic Journal Of Probability
Pagination
17
Volume
20
Pages
3
Date
2015
Publisher
Seattle, Univ Washington, Dept Mathematics
ISSN
1083-6489
Keywords
Other identifier(s)
View record in Web of Science
Laboratories
PRST
Record Appears in
Scientific production and competences > SB - School of Basic Sciences > MATH - Institute of Mathematics > PRST - Chair of Stochastic Processes
Scientific production and competences > SB - School of Basic Sciences > Mathematics
Peer-reviewed publications
Work produced at EPFL
Journal Articles
Published
Scientific production and competences > SB - School of Basic Sciences > Mathematics
Peer-reviewed publications
Work produced at EPFL
Journal Articles
Published
Record creation date
2015-04-13