Vibrações Livres e a Função de Green Temporal para um Modelo de Euler-Bernoulli
DOI:
https://doi.org/10.5540/tema.2002.03.02.0093Abstract
Este trabalho visa a obtenção da resposta impulso, ou função de Green temporal para uma viga longa e fina descrita pela equação de Euler-Bernoulli sob a influência de uma força axial. Simulações para a função de Green temporal são apresentadas para vigas fixas-livre, engastadas, e deslizante-apoiada.References
[1] J. Claeyssen, G. Suazo, C. Jung, A direct approach to second-order matrix non-classical vibrating equations, Applied Numerical Mathematics, 30 (1999), 65-78.
J.R. Claeyssen, L.D. Chiwiacowsky, G.S. Suazo, The impulse response in the symbolic computating of modes for beams and plates, Applied Numerical Mathematics, 40 (2002), 119-135.
D. Findeisen, System Dynamics and Mechanical Vibrations", Springer-Verlag, 2001.
M.K. Giareta, J.R. Claeyssen, Vibrações forçadas com força axial, em Aplicon" (J.M. Balthazar et al., eds.), USP, São Carlos, 2001.
J. Ginsberg, Mechanical and Structural Vibrations", John Wiley, 2001.
A.J. Hull, A closed form solution of a longitudinal bar with a viscous boundary condition, J. Sound Vib., 169, No. 1 (1994), 19-28.
R.A.L. Soder, J.R. Claeyssen, Modos Flexurais sob a Influência de uma Força Axial, em XXIII CNMAC", Santos, São Paulo, 2000.
Downloads
Published
How to Cite
Issue
Section
License
Authors who publish in this journal agree to the following terms:
Authors retain copyright and grant the journal the right of first publication, with the work simultaneously licensed under the Creative Commons Attribution License that allows the sharing of the work with acknowledgment of authorship and initial publication in this journal.
Authors are authorized to assume additional contracts separately, for non-exclusive distribution of the version of the work published in this journal (eg, publish in an institutional repository or as a book chapter), with acknowledgment of authorship and initial publication in this journal.
Authors are allowed and encouraged to publish and distribute their work online (eg, in institutional repositories or on their personal page) at any point before or during the editorial process, as this can generate productive changes as well as increase impact and the citation of the published work (See The effect of open access).
This is an open access journal which means that all content is freely available without charge to the user or his/her institution. Users are allowed to read, download, copy, distribute, print, search, or link to the full texts of the articles, or use them for any other lawful purpose, without asking prior permission from the publisher or the
author. This is in accordance with the BOAI definition of open access
Intellectual Property
All the contents of this journal, except where otherwise noted, is licensed under a Creative Commons Attribution License under attribution BY.