1. Free Vibrations with Large Amplitude of Axially Loaded Beams on an Elastic Foundation Using the Adomian Modified Decomposition Method
- Author
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Askar Ibrayev, Alima Tazabekova, Jong Kim, and Desmond Adair
- Subjects
Physics ,0209 industrial biotechnology ,Series (mathematics) ,Article Subject ,Mechanical Engineering ,Mathematical analysis ,010103 numerical & computational mathematics ,02 engineering and technology ,Geotechnical Engineering and Engineering Geology ,Condensed Matter Physics ,01 natural sciences ,lcsh:QC1-999 ,Vibration ,Algebraic equation ,Nonlinear system ,020901 industrial engineering & automation ,Mechanics of Materials ,Normal mode ,Decomposition method (constraint satisfaction) ,0101 mathematics ,Axial symmetry ,Eigenvalues and eigenvectors ,lcsh:Physics ,Civil and Structural Engineering - Abstract
Analytical solutions describing free transverse vibrations with large amplitude of axially loaded Euler–Bernoulli beams for various end restrains resting on a Winkler one-parameter foundation are obtained using the Adomian modified decomposition method (AMDM). The AMDM allows the governing equation to become a recursive algebraic equation, and, after some additional simple mathematical operations, the equations can be cast as an eigenvector problem whose solution results in the calculation of natural frequencies and corresponding closed-form series solution of the mode shapes. Important to the use of the Adomian modified decomposition method is the treatment of the nonlinear Fredholm integral coefficient, which forms part of the governing equation. In addition to the calculation of natural frequencies and mode shapes, investigations are made of the effects on the free vibrations of the Winkler parameter and of increasing the axial loading.
- Published
- 2019
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