Title :
Computation of the simplest normal form for the singularity of two non-semisimple double zero eigenvalues
Author :
Chen, Shuping ; Zhang, Wei ; Yao, Minghui
Author_Institution :
Coll. of Mech. Eng., Beijing Univ. of Technol., Beijing, China
Abstract :
In this paper a method is presented for computing the simplest normal form for a vector field associated with the singularity of two non-semisimple double zero eigenvalues. The method developed here uses the lower order nonlinear terms in the normal form for the simplifications of higher order terms. An explicit formulae are derived, which can be used to compute the coefficients of the simplest normal form and the associated nonlinear transformation. The theoretical model for the nonlinear oscillation of a simply supported rectangular thin plate is given to demonstrate the computational efficiency of the method.
Keywords :
continuum mechanics; eigenvalues and eigenfunctions; nonlinear dynamical systems; oscillations; plates (structures); explicit formulae; higher order term simplifications; lower order nonlinear terms; nonlinear oscillation; nonlinear transformation; nonsemisimple double zero eigenvalue singularity; simplest normal form coefficients; simply supported rectangular thin plate; vector field; Differential equations; Eigenvalues and eigenfunctions; Equations; Heuristic algorithms; Mathematical model; Nonlinear systems; Oscillators; near-identity coordinate changes; nonlinear dynamics; normal form; thin plate;
Conference_Titel :
Mechanic Automation and Control Engineering (MACE), 2011 Second International Conference on
Conference_Location :
Hohhot
Print_ISBN :
978-1-4244-9436-1
DOI :
10.1109/MACE.2011.5987131
