Professor Mikhail Menshikov mikhail.menshikov@durham.ac.uk
Professor
On the connectivity properties of the complementary set in fractal percolation models
Menshikov, M.V.; Yu, Popov S.; Vachkovskaia, M.
Authors
Popov S. Yu
M. Vachkovskaia
Abstract
We study the connectivity properties of the complementary set in Poisson multiscale percolation model and in Mandelbrot's percolation model in arbitrary dimension. By using a result about majorizing dependent random fields by Bernoulli fields, we prove that if the selection parameter is less than certain critical value, then, by choosing the scaling parameter large enough, we can assure that there is no percolation in the complementary set.
Citation
Menshikov, M., Yu, P. S., & Vachkovskaia, M. (2001). On the connectivity properties of the complementary set in fractal percolation models. Probability Theory and Related Fields, 119(2), 176-186. https://doi.org/10.1007/pl00008757
Journal Article Type | Article |
---|---|
Publication Date | Feb 1, 2001 |
Deposit Date | May 1, 2007 |
Journal | Probability Theory and Related Fields |
Print ISSN | 0178-8051 |
Electronic ISSN | 1432-2064 |
Publisher | Springer |
Peer Reviewed | Peer Reviewed |
Volume | 119 |
Issue | 2 |
Pages | 176-186 |
DOI | https://doi.org/10.1007/pl00008757 |
Public URL | https://durham-repository.worktribe.com/output/1599522 |
You might also like
Reflecting Brownian motion in generalized parabolic domains: explosion and superdiffusivity
(2023)
Journal Article
Stochastic billiards with Markovian reflections in generalized parabolic domains
(2023)
Journal Article
Random walks avoiding their convex hull with a finite memory
(2019)
Journal Article
Long term behaviour of two interacting birth-and-death processes
(2018)
Journal Article
Downloadable Citations
About Durham Research Online (DRO)
Administrator e-mail: dro.admin@durham.ac.uk
This application uses the following open-source libraries:
SheetJS Community Edition
Apache License Version 2.0 (http://www.apache.org/licenses/)
PDF.js
Apache License Version 2.0 (http://www.apache.org/licenses/)
Font Awesome
SIL OFL 1.1 (http://scripts.sil.org/OFL)
MIT License (http://opensource.org/licenses/mit-license.html)
CC BY 3.0 ( http://creativecommons.org/licenses/by/3.0/)
Powered by Worktribe © 2024
Advanced Search