Spatial Structure in Low Dimensions for Diffusion Limited Two-Particle Reactions
摘要
Consider the system of particles on where particles are of two types, and , and execute simple random walks in continuous time. Particles do not interact with their own type, but when a type particle meets a type particle, both disappear. Initially, particles are assumed to be distributed according to homogeneous Poisson random fields, with equal intensities for the two types. This system serves as a model for the chemical reaction . In [BrLe91a], the densities of the two types of particles were shown to decay asymptotically like for and for , as . This change in behavior from low to high dimensions corresponds to a change in spatial structure. In , particle types segregate, with only one type present locally. After suitable rescaling, the process converges to a limit, with density given by a Gaussian process. In , both particle types are, at large times, present locally in concentrations not depending on the type, location or realization. In , both particle types are present locally, but with varying concentrations. Here, we analyze this behavior in ; the behavior for will be handled in a future work [BrLe99].
引用
@article{arxiv.math-ph/0003022,
title = {Spatial Structure in Low Dimensions for Diffusion Limited Two-Particle Reactions},
author = {M. Bramson and J. L. Lebowitz},
journal= {arXiv preprint arXiv:math-ph/0003022},
year = {2007}
}
备注
80 pages in an AMSTeX file, e-mail addresses: [email protected] and [email protected], replace for AMSTeX compilation error