English

Projecting dynamical systems via a support bound

Symbolic Computation 2026-04-17 v4 Algebraic Geometry Classical Analysis and ODEs

Abstract

For a polynomial dynamical system, we study the problem of computing the minimal differential equation satisfied by a chosen coordinate (in other words, projecting the system on the coordinate). This problem can be viewed as a special case of the general elimination problem for systems of differential equations and appears in applications to modeling and control. We give a bound for the Newton polytope of such minimal equation. Our bound depends on the dimension of the model and the degrees dd and DD of the polynomials defining the dynamics of the chosen coordinate and the remaining coordinates, respectively. We show that our bound is sharp if dDd \leqslant D or the model is planar. We further use this bound to design an algorithm for computing the minimal equation following the evaluation-interpolation paradigm. We demonstrate that our implementation of the algorithm can tackle problems which are out of reach for the state-of-the-art software for differential elimination.

Keywords

Cite

@article{arxiv.2501.13680,
  title  = {Projecting dynamical systems via a support bound},
  author = {Yulia Mukhina and Gleb Pogudin},
  journal= {arXiv preprint arXiv:2501.13680},
  year   = {2026}
}
R2 v1 2026-06-28T21:14:51.115Z