Title :
Analytic linearization of PDE´s through Lie symmetries
Author :
Menini, Laura ; Tornambe, Antonio
Author_Institution :
Dipt. di Inf., Sist. e Produzione, Univ. di Roma Tor Vergata, Rome, Italy
Abstract :
In recent years, some new results have been established about the linearization of finite-dimensional nonlinear dynamical systems by means of diffeomorphisms, being analytic at the origin. Such results are based on the knowledge of a particular Lie-symmetry of the given system about the origin. In this paper, a class of nonlinear PDE´s is considered, for which a similar necessary and sufficient condition for linearization about the “origin” is derived. As in the case of finite-dimensional linear systems, the knowledge of a Lie symmetry allows the use of known techniques for the computation of the (exact or approximated) linearizing change of coordinates.
Keywords :
Lie algebras; nonlinear differential equations; nonlinear dynamical systems; partial differential equations; Lie symmetries; analytic linearization; diffeomorphisms; finite-dimensional linear systems; finite-dimensional nonlinear dynamical systems; necessary condition; nonlinear PDE; sufficient condition; Abstracts; Equations; Integral equations; Nonlinear dynamical systems; Partial differential equations; Stability analysis; Vectors;
Conference_Titel :
American Control Conference (ACC), 2012
Conference_Location :
Montreal, QC
Print_ISBN :
978-1-4577-1095-7
Electronic_ISBN :
0743-1619
DOI :
10.1109/ACC.2012.6314899
