English

A necessary condition for dynamic equivalence

Optimization and Control 2011-12-14 v2

Abstract

If two control systems on manifolds of the same dimension are dynamic equivalent, we prove that either they are static equivalent --i.e. equivalent via a classical diffeomorphism-- or they are both ruled; for systems of different dimensions, the one of higher dimension must ruled. A ruled system is one whose equations define at each point in the state manifold, a ruled submanifold of the tangent space. Dynamic equivalence is also known as equivalence by endogenous dynamic feedback, or by a Lie-B\"acklund transformation when control systems are viewed as underdetermined systems of ordinary differential equations; it is very close to absolute equivalence for Pfaffian systems. It was already known that a differentially flat system must be ruled; this is a particular case of the present result, in which one of the systems is assumed to be "trivial" (or linear controllable).

Keywords

Cite

@article{arxiv.0805.0721,
  title  = {A necessary condition for dynamic equivalence},
  author = {Jean-Baptiste Pomet},
  journal= {arXiv preprint arXiv:0805.0721},
  year   = {2011}
}

Comments

SIAM Journal on Control and Optimization To appear (2008)

R2 v1 2026-06-21T10:37:46.767Z