Adjoint and Hamiltonian input-output differential equations

Author

Crouch, Peter E. ; Lamnabhi-Lagarrigue, Francoise ; Van Der Schaft, Arjan J.

Author_Institution

Center for Syst. Sci. & Eng., Arizona State Univ., Tempe, AZ, USA

Volume

40

Issue

4

fYear

1995

fDate

4/1/1995 12:00:00 AM

Firstpage

603

Lastpage

615

Abstract

Based on developments in the theory of variational and Hamiltonian control systems by Crouch and van der Schaft (1987), this paper answers two questions: given an input-output differential equation description of a nonlinear system, what is the adjoint variational system in input-output differential form and what are the conditions for the system to be Hamiltonian, i.e., such that the variational and the adjoint variational systems coincide? This resulting set of conditions is then used to generalize classical conditions such as the well-known Helmholtz conditions for the inverse problem in classical mechanics

Keywords

Helmholtz equations; differential equations; nonlinear control systems; Hamiltonian control systems; Hamiltonian input-output differential equations; Helmholtz conditions; I/O differential equations; adjoint variational system; nonlinear system; variational control systems; Control systems; Differential equations; Helium; Inverse problems; Lagrangian functions; Mathematics; Nonlinear control systems; Nonlinear systems; Senior members; Systems engineering and theory;

fLanguage

English

Journal_Title

Automatic Control, IEEE Transactions on

Publisher

ieee

ISSN

0018-9286

Type

jour

DOI

10.1109/9.376115

Filename

376115