Mutually Catalytic Super Branching Random Walks: Large Finite Systems and Renormalization Analysis

Cox JT, Dawson DA, Greven A (2004)

Publication Language: English

Publication Type: Authored book

Publication year: 2004

Journal

Memoirs of the American Mathematical Society American Mathematical Society

Publisher: American Mathematical Society

Series: Memoirs of the American Mathematical Society

Book Volume: 171

Pages Range: 97 pages

Journal Issue: 809

ISBN: 978-0-8218-3542-5

DOI: 10.1090/memo/0809

Abstract

We study features of the longtime behavior and the spatial continuum limit for the diffusion limit of the following particle model. Consider populations consisting of two types of particles located on sites labeled by a countable group. The populations of each of the types evolve as follows: Each particle performs a random walk and dies or splits in two with probability 12" id="MathJax-Element-1-Frame" role="presentation" style="position: relative;" tabindex="0">12 - See more at: http://bookstore.ams.org/memo-171-809/#sthash.egAxcAfQ.dpuf

Authors with CRIS profile

Andreas Greven Lehrstuhl für Mathematische Stochastik

How to cite

APA:

Cox, J.T., Dawson, D.A., & Greven, A. (2004). Mutually Catalytic Super Branching Random Walks: Large Finite Systems and Renormalization Analysis. American Mathematical Society.

MLA:

Cox, J. Theodore, Donald Andrew Dawson, and Andreas Greven. Mutually Catalytic Super Branching Random Walks: Large Finite Systems and Renormalization Analysis. American Mathematical Society, 2004.

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