An algebraic approach to nonlinear functional expansions

Abstract

A new theory of functional expansion is presented which makes use of formal power series in several noncommutative variables and of iterated integrals. A simple closed-form expression for the solution of a nonlinear differential equation with forcing terms is derived, which enables us to give the corresponding Volterra kernels with utmost precision. The noncommutative variables give birth to a symbolic calculus which generalizes in a nonlinear setting many features of the Laplace and Fourier transforms and which is developed in order to simplify some computations, like the so-called association of variables, related to high-order transfer functions.

Keywords

This publication has 30 references indexed in Scilit:

Réalisation locale des systèmes non linéaires, algèbres de Lie filtrées transitives et séries génératrices non commutatives
Inventiones Mathematicae, 1983
A new symbolic calculus for the response of nonlinear systems
Systems & Control Letters, 1982
Application of a new functional expansion to the cubic anharmonic oscillator
Journal of Mathematical Physics, 1982
Algebraic computation of the solution of some nonlinear differential equations
Lecture Notes in Computer Science, 1982
The existence and uniqueness of Volterra series for nonlinear systems
IEEE Transactions on Automatic Control, 1978
Generalized polynomial operators for nonlinear systems analysis
IEEE Transactions on Automatic Control, 1972
Contrôlabilité des Systèmes non Linéaires
SIAM Journal on Control, 1970
Multidimensional Laplace transforms for solution of nonlinear equations
Proceedings of the Institution of Electrical Engineers, 1969
The Use of Functionals in the Analysis of Non-linear Physical Systems†
Journal of Electronics and Control, 1963
On the Accessibility Problem in Control Theory
Published by Elsevier BV ,1963

Cited by 207 articles