A Sufficient Condition for the Super-linearization of Polynomial Systems

Abstract

We provide in this paper a sufficient condition for a polynomial dynamical system x(t) = f(x(t)) to be super-linearizable, i.e., to be such that all its trajectories are linear projections of the trajectories of a linear dynamical system. The condition is expressed in terms of the hereby introduced weighted dependency graph G, whose nodes vi correspond to variables xi and edges vivj have weights ∂ fj∂ xi. We show that if the product of the edge weights along any cycle in G is a constant, then the system is super-linearizable. The proof is constructive, and we provide an algorithm to obtain super-linearizations and illustrate it on an example.