The dynamics of a non-linear discrete oscillator

This contribution reports on a dynamic analysis of an elasto-plastic oscillator. Kinematic and isotropic hardening are considered. The equations of motion have five state variables associated with complementary conditions. System dynamics is treated by performing a split in phase space in two parts.

The Karhunen}Loeve (K}L) decomposition procedure is applied to a system of coupled cantilever beams with non-linear grounding sti!nesses and a system of non-linearly coupled rods. The former system possesses localized non-linear normal modes (NNMs) for certain values of the coupling parameters and h

This paper presents a power series approach to accurately obtain the damped separatrices for a class of unforced non-linear oscillators. This in turn delineates the basins of attraction of two or more stable attractors in the phase space. The method is illustrated by its applications to the unforced

## Abstract We present several stability/instability results for the ground‐state standing waves and high‐energy‐bound‐state standing waves for the NLKG, NLS and NLDW equations. At the end of the paper we present a number of open problems. Copyright © 2004 John Wiley & Sons, Ltd.