English

Differential Correspondences and Control Theory

General Mathematics 2021-07-20 v1

Abstract

When a differential field KK having nn commuting derivations is given together with two finitely generated differential extensions LL and MM of KK, an important problem in differential algebra is to exhibit a common differential extension NN in order to define the new differential extensions LML\cap M and the smallest differential field (L,M)N(L,M)\subset N containing both LL and MM. Such a result allows to generalize the use of complex numbers in classical algebra. Having now two finitely generated differential modules LL and MM over the non-commutative ring ring D=K[d1,...,dn]=K[d]D=K[d_1,... ,d_n]=K[d] of differential operators with coefficients in KK, we may similarly look for a differential module NN containing both LL and MM in order to define LML\cap M and L+ML+M. This is {\it exactly} the situation met in linear or non-linear OD or PD control theory by selecting the inputs and the outputs among the control variables. However, in many recent books and papers, we have shown that controllability was a {\it built-in} property of a control system, not depending on the choice of inputs and outputs. The main purpose of this paper is to revisit control theory by showing the specific importance of the two previous problems and the part plaid by NN in both cases for the parametrization of the control system. The essential tool will be the study of {\it differential correspondences}, a modern name for what was called {\it B\"{a}cklund problem} during the last century, namely the study of elimination theory for groups of variables among systems of linear or nonlinear OD or PD equations. The difficulty is to revisit {\it differential homological algebra} by using non-commutative localization. Finally, when MM is a DD-module, this paper is using for the first time the fact that the system R=homK(M,K)R=hom_K(M,K) is a DD-module for the Spencer operator acting on sections.

Keywords

Cite

@article{arxiv.2107.08797,
  title  = {Differential Correspondences and Control Theory},
  author = {J. -F. Pommaret},
  journal= {arXiv preprint arXiv:2107.08797},
  year   = {2021}
}

Comments

Up to the knowledge of the author, this paper is using for the first time the Spencer operator in order to avoid behaviors, trajectories and signal spaces in the study of linear OD or PD control systems with variable coefficients

R2 v1 2026-06-24T04:19:08.672Z