Internal composite bound states in deterministic reaction diffusion models
Statistical Mechanics
2013-10-24 v2 Pattern Formation and Solitons
Chemical Physics
Abstract
By identifying potential composite states that occur in the Sel'kov-Gray-Scott (GS) model, we show that it can be considered as an effective theory at large spatio-temporal scales, arising from a more \textit{fundamental} theory (which treats these composite states as fundamental chemical species obeying the diffusion equation) relevant at shorter spatio-temporal scales. When simulations in the latter model are performed as a function of a parameter , the generated spatial patterns evolve at late times into those of the GS model at large , implying that the composites follow their own unique dynamics at short scales. This separation of scales is an example of \textit{dynamical} decoupling in reaction diffusion systems.
Cite
@article{arxiv.1307.3236,
title = {Internal composite bound states in deterministic reaction diffusion models},
author = {Fred Cooper and Gourab Ghoshal and Alec Pawling and Juan Pérez Mercader},
journal= {arXiv preprint arXiv:1307.3236},
year = {2013}
}
Comments
5 pages, 3 Figures