CURVATURE-BASED BEAM ELEMENTS FOR THE ANALYSIS OF TIMOSHENKO AND SHEAR-DEFORMABLE CURVED BEAMS

A five-noded thirteen DOF horizontally curved beam element with or without an elastic base is presented. One set of fourth-degree Lagrangian polynomials in natural co-ordinates is used for interpolation of beam geometry and vertical displacement while the angles of transverse rotation and twist are

In this paper a uni®ed ®nite element model that contains the Euler±Bernoulli, Timoshenko and simpli®ed Reddy third-order beam theories as special cases is presented. The element has only four degrees of freedom, namely de¯ection and rotation at each of its two nodes. Depending on the choice of the e

The quasi-static and dynamic responses of a linear viscoelastic Timoshenko beam on Winkler foundation are studied numerically by using the hybrid Laplace-Carson and finite element method. In this analysis the field equation for viscoelastic material is used. In the transformed Laplace-Carson space t

The finite element method achieves an approximate solution by subdividing the domain of interest into a number of smaller sub-domains, called finite elements, and then approximating the solution by using local, piecewise continuous polynomial functions within each element. The accuracy of the soluti