1. Geometrically non-linear free and forced vibration of a shallow arch
- Author
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Said Rifai, Yassine El Khouddar, Ahmed Adri, Rhali Benamar, and Omar Outassafte
- Subjects
shallow arch ,Mechanical Engineering ,Mathematical analysis ,Vibration ,free and forced vibration ,Nonlinear system ,Algebraic equation ,Bernoulli's principle ,symbols.namesake ,second formulation ,backbone curves ,hamilton’s principle ,Euler's formula ,symbols ,TJ1-1570 ,General Materials Science ,Hamilton's principle ,Mechanical engineering and machinery ,Arch ,newton-raphson ,Eigenvalues and eigenvectors ,Mathematics ,initial rise - Abstract
The purpose of this present work is to investigate the geometrical non-linearity in free and forced vibration of a shallow arch elastically restrained at the ends. The non-linear governing equilibrium equation of the shallow arch is obtained after the Euler Bernoulli theory and the Von Karman geometrical non-linearity assumptions. After applying the ends conditions, the eigenvalues problem of the generalized trancendant equation have been determined iteratively using the Newton-Raphson algorithm. The kinetic and total strain energy have been discretized into a series of a finite spatial functions which are a combination of linear modes and basic function contribution coefficients. Using Hamilton’s principle energy and spectral analysis, the problem is reduced into a set of non-linear algebraic equations that solved numerically using an approximate explicit method developed previously the so-called second formulation. Considering a multimode approach, the effect of initial rise and concentrated force on non-linear behaviour of system has been illustrated in the backbone curves giving the non-linear amplitude-frequency dependence. The corresponding non-linear deflections and curvatures have been plotted for various vibration amplitudes.
- Published
- 2021