Finite element for non-stationary problems of viscoelastic orthotropic beams
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Date issued
2011
Journal Title
Journal ISSN
Volume Title
Publisher
University of West Bohemia
Abstract
The main aim of this work is to derive a finite beam element especially for solving of non-stationary problems of thin viscoelastic orthotropic beams. Presented approach combines the Timoshenko beam theory with the consideration
of nonzero axial strain. Furthermore, the discrete Kelvin-Voight material model was employed for the
description of beam viscoelastic material behaviour. The presented finite beam element was derived by means of
the principle of virtual work. The beam deflection and the slope of the beam have been determined by the analytical
and numerical (FEM) approach. These studies were made in detail on the simple supported beam subjected to
the non-stationary transverse continuous loading described by the cosine function in space and by the Heaviside
function in time domain. The study shows that beam deformations obtained by using derived finite element give
a very good agreement with the analytical results.
Description
Subject(s)
nosníky, viskoelasticita, numerická simulace, kmitání konstrukcí
Citation
Applied and Computational Mechanics. 2011, vol. 5, no. 1, p. 89-100.