Abstract (EN):
The geometrically nonlinear vibrations of beams which may experience longitudinal, torsional
and bending deformations in any plane are investigated by the p-version finite element method.
Bernoulli-Euler or Timoshenko¿s beam theories are considered for bending and Saint-Venants¿s for
torsion. A warping function is included in the model. The geometrical nonlinearity is taken into account
by considering the Green¿s strain tensor and the longitudinal displacements of quadratic order,
which are most often neglected in the strain displacement relation, are considered here. Generalised
Hooke¿s law is used and the equation of motion is derived by the principle of virtual work.
Comparisons of both models, Bernoulli-Euler and Timoshenko, and comparison of models including
and neglecting the quadratic terms of longitudinal displacements are presented. It is shown that Timoshenko¿s
theory gives better results than Bernoulli-Euler¿s when the bending and torsion motions are
coupled and the nonlinear terms become important. This is explained by the fact that when bending
and torsion are coupled, the rotations along the transverse axes of the beam cannot be approximated
by the respective derivatives of the transverse displacement functions as is assumed in BernoulliEuler¿s
theory. The importance of warping is also analysed for different rectangular cross sections,
and it is shown that its consideration can be fundamental to obtain correct results.
Language:
English
Type (Professor's evaluation):
Scientific
No. of pages:
12