Competing super-brownian motions as limits of interacting particle systems
Publication
, Journal Article
Durrett, R; Mytnik, L; Perkins, E
Published in: Electronic Journal of Probability
January 1, 2005
We study two-type branching random walks in which the birth or death rate of each type can depend on the number of neighbors of the opposite type. This competing species model contains variants of Durrett’s predator-prey model and Durrett and Levin’s colicin model as special cases. We verify in some cases convergence of scaling limits of these models to a pair of super-Brownian motions interacting through their collision local times, constructed by Evans and Perkins. © 2005 Applied Probability Trust.
Duke Scholars
Published In
Electronic Journal of Probability
DOI
EISSN
1083-6489
Publication Date
January 1, 2005
Volume
10
Start / End Page
1147 / 1220
Related Subject Headings
- Statistics & Probability
- 0105 Mathematical Physics
- 0104 Statistics
Citation
APA
Chicago
ICMJE
MLA
NLM
Durrett, R., Mytnik, L., & Perkins, E. (2005). Competing super-brownian motions as limits of interacting particle systems. Electronic Journal of Probability, 10, 1147–1220. https://doi.org/10.1214/EJP.v10-229
Durrett, R., L. Mytnik, and E. Perkins. “Competing super-brownian motions as limits of interacting particle systems.” Electronic Journal of Probability 10 (January 1, 2005): 1147–1220. https://doi.org/10.1214/EJP.v10-229.
Durrett R, Mytnik L, Perkins E. Competing super-brownian motions as limits of interacting particle systems. Electronic Journal of Probability. 2005 Jan 1;10:1147–220.
Durrett, R., et al. “Competing super-brownian motions as limits of interacting particle systems.” Electronic Journal of Probability, vol. 10, Jan. 2005, pp. 1147–220. Scopus, doi:10.1214/EJP.v10-229.
Durrett R, Mytnik L, Perkins E. Competing super-brownian motions as limits of interacting particle systems. Electronic Journal of Probability. 2005 Jan 1;10:1147–1220.
Published In
Electronic Journal of Probability
DOI
EISSN
1083-6489
Publication Date
January 1, 2005
Volume
10
Start / End Page
1147 / 1220
Related Subject Headings
- Statistics & Probability
- 0105 Mathematical Physics
- 0104 Statistics