LINEAR DYNAMICS OF CURVED TENSIONED ELASTIC BEAMS

This paper is concerned with the large amplitude transverse, in-plane vibration of a hinged, initially prestressed, extensible elastic beam. The non-linear partial differential equations that take into account transverse and axial inertial forces, as well as the rotary inertial term, are derived. In

## Abstract This work presents a mixed stress finite element for linear elastodynamics of arbitrarily curved beams based on a modified Hellinger–Reissner functional. A rational approach to choose the stress approximation is proposed. In particular, the self‐equilibrated stress is augmented by some

In this paper, a set of non-linear equations of motion for a single-tendon tension leg platform are developed. The equations of motion consist of partial differential equations representing the transverse and longitudinal response of the tendon. In addition, a mixed formulation partial differential

The non-linear vibrations of an elastic beam resting on a non-linear tensionless Winkler foundation subjected to a concentrated load at the centre is presented in this paper. Since the foundation is assumed to be tensionless, the beam may lift off the foundation and there exists different regions na

The dynamic characteristics of a rotating curved beam are investigated. The equations of motion include all dynamic e!ects such as Coriolis force, centrifugal force and acceleration. The analysis of the rotating beam takes into account the coupling between rigid-body motion and elastic deformation,