Dynamics of 3-D co-rotational beams

A co-rotational total Lagrangian finite element formulation for the geometrically nonlinear dynamic analysis of spatial Euler beam with large rotations but small strain, is presented. The nodal coordinates, displacements, rotations, velocities, accelerations, and the equations of motion of the stru

The formulation of dynamic procedures for three-dimensional (3-D) beams requires extensive use of the algebra pertaining to the non-linear character of the rotation group in space. The corresponding extraction procedure to obtain the rotations that span a time step has certain limitations, which can

The dynamic analysis of beams undergoing large deflections are studied in this work. For simplicity and better undestanding of the basic concepts, we focus attention on two-dimensional analysis of beams. The Euler-Bernoulli hypothesis is employed with the beam undergoing large rotations but small st

In this paper we present a way to extend the earlier static master±slave formulation for beams and joints [1] to dynamic problems. The dynamic master±slave approach is capable of (i) handling the problems of linear elasticity in a geometrically non-linear environment, (ii) accounting for the non-lin