An algorithm for finding weakly reversible deficiency zero realizations of polynomial dynamical systems
Abstract
Systems of differential equations with polynomial right-hand sides are very common in applications. On the other hand, their mathematical analysis is very challenging in general, due to the possibility of complex dynamics: multiple basins of attraction, oscillations, and even chaotic dynamics. Even if we restrict our attention to mass-action systems, all of these complex dynamical behaviours are still possible. On the other hand, if a polynomial dynamical system has a weakly reversible deficiency zero () realization, then its dynamics is known to be remarkably simple: oscillations and chaotic dynamics are ruled out and, up to linear conservation laws, there exists a single positive steady state, which is asymptotically stable. Here we describe an algorithm for finding realizations of polynomial dynamical systems, whenever such realizations exist.
Cite
@article{arxiv.2205.14267,
title = {An algorithm for finding weakly reversible deficiency zero realizations of polynomial dynamical systems},
author = {Gheorghe Craciun and Jiaxin Jin and Polly Y. Yu},
journal= {arXiv preprint arXiv:2205.14267},
year = {2022}
}
Comments
20 pages, 4 figures