We study a system of two interacting populations which undergo
random migration and mutually catalytic branching. The branching rate of one
population at a site is proportional to the mass of the other population at the
site. The system is modelled by an infinite system of stochastic differential
equations, allowing symmetric Markov migration, if the set of sites is discrete
$(\mathbb{Z}^d)$, or by a stochastic partial differential equation with
Brownian migration if the set of sites is the real line. A duality technique of
Leonid Mytnik, which gives uniqueness in law, is used to examine the long-time
behavior of the solutions. For example, with uniform initial conditions, the
process converges to an equilibrium distribution as $t \to \infty$, and there
is coexistence of types in the equilibrium “iff ” the random
migration is transient.
@article{1022855746,
author = {Dawson, Donald A. and Perkins, Edwin A.},
title = {Long-time behavior and coexistence in a mutually catalytic
branching model},
journal = {Ann. Probab.},
volume = {26},
number = {1},
year = {1998},
pages = { 1088-1138},
language = {en},
url = {http://dml.mathdoc.fr/item/1022855746}
}
Dawson, Donald A.; Perkins, Edwin A. Long-time behavior and coexistence in a mutually catalytic
branching model. Ann. Probab., Tome 26 (1998) no. 1, pp. 1088-1138. http://gdmltest.u-ga.fr/item/1022855746/