Non-linear models of a vibrating elasticum

Vibrating systems usually have an in"nite number of degrees of freedom (d.o.f.). Since a "nite number of measurement d.o.f. can only capture certain deformation patterns, the spatial characteristics of vibrating systems are only partially observed experimentally. This research examines the e!ects of

The motivation behind this work is to develop a dynamical systems understanding of the phenomenon of squeal. Squeal is a form of self-excited vibration; vibrations are induced in a structure such as a wheel or violin string by the action of a frictional driving force. The nature of this force is rat

## Abstract We prove the existence of infinitely many non‐zero time‐periodic solutions (breathers) to the dispersive wave equation of the form magnified image which are localized in the spatial variable, that is magnified image The main tool employed is the concentration compactness principle of P

Vibration isolators consisting of polymeric materials exhibit non-linearity in their stiffness and damping characteristics. Two different approaches towards modelling these non-linear characteristics are discussed. In one approach, experimentally obtained hysteresis loops are modelled through a suit