FORCED VIBRATION RESPONSES OF A VISCOELASTIC STRUCTURE

A method of analysis for the forced vibration of a beam with viscoelastic boundary supports is proposed based on complex normal mode analysis. The viscoelastic support regions are first described in terms of equivalent complex stiffness coefficients, and then using the complex modes of the beam syst

The non-linear forced fibration of viscoelastic moving belts excited by the eccentricity of pulleys is investigated. The generalized equations of motion are derived for a viscoelastic moving belt with geometric non-linearities by adopting the linear viscoelastic differential constitutive law. The me

Responses of a beam undergoing both axial and transverse vibration are studied when the beam is subjected to transverse forces. The beam is supported by a torsional spring at the base and has a point mass at the free end. This is a simpli"ed model of a complaint o!shore structure. It is assumed that

Various aspects of the forced response of a damped one-dimensional periodic structure are considered. Initially, the attenuation produced by damping is investigated, and it is shown that this may be of the same order of magnitude as the localization factor produced by structural irregularity. An eff

The dynamics of a multidegree impact vibrator subject to harmonic loading is investigated. The system is represented by a lumped mass model which hits and rebounds from a rigid wall during vibration. The periodic solution to the equations of motion with N forcing cycles and P impacts is formulated.