Journal ArticleDOI
On the accuracy of the multiple scales method for non-linear vibrations of doubly curved shallow shells
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In this article, nonlinear free and forced vibrations of doubly curved isotropic shallow shells are investigated via multi-modal Galerkin discretization and the method of multiple scales.Abstract:
Non-linear free and forced vibrations of doubly curved isotropic shallow shells are investigated via multi-modal Galerkin discretization and the method of multiple scales. Donnell’s non-linear shallow shell theory is used and it is assumed that the shell is simply supported with movable edges. By deriving two different forms of the stress function, the equations of motion are reduced to a system of infinite non-linear ordinary differential equations with quadratic and cubic non-linearities. A quadratic relation between the excitation and the fundamental frequency is considered and it is shown that, although in case of hardening non-linearities the results resemble those found via numerical integration or continuation softwares, in case of softening non-linearity the solution breaks down as the amplitude becomes larger than the thickness. Results reveal that, expressing the relation between the excitation and fundamental frequency in this form, which was considered by many researchers as a useful tool in analyzing strong non-linear oscillators, yields in spurious results when the non-linearity becomes of softening type.read more
Citations
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Journal ArticleDOI
Non-linear vibrations of shells: A literature review from 2003 to 2013
Farbod Alijani,Marco Amabili +1 more
TL;DR: In this paper, a review of geometrically non-linear free and forced vibrations of shells made of traditional and advanced materials is presented, including closed shells and curved panels made of isotropic, laminated composite, piezoelectric, functionally graded and hyperelastic materials.
Journal ArticleDOI
Nonlinear vibrations of functionally graded doubly curved shallow shells
TL;DR: In this paper, the Galerkin method was used to reduce the nonlinear forced vibrations of FGM doubly curved shallow shells with a rectangular base to a system of infinite nonlinear ordinary differential equations with quadratic and cubic nonlinearities.
Journal ArticleDOI
Nonlinear vibrations of FGM rectangular plates in thermal environments
TL;DR: In this article, the effect of temperature variations as well as volume fraction exponent is discussed and it is illustrated that thermally deformed FGM plates have stronger hardening behaviour; on the other hand, the effect is not significant, but modal interactions may rise in thermally deformable FGM plate that could not be seen in their undeformed isotropic counterparts.
Journal ArticleDOI
Thermal effects on nonlinear vibrations of functionally graded doubly curved shells using higher order shear deformation theory
TL;DR: In this article, the effects of FGM power law index, thickness ratio and temperature variations on the frequency-amplitude nonlinear response are fully discussed and it is revealed that, for relatively thick and deep shells, the Amabili-Reddy theory which retains all the nonlinear terms in the in-plane displacements gives different and more accurate results.
Journal ArticleDOI
Linear and nonlinear free vibration of a multilayered magneto-electro-elastic doubly-curved shell on elastic foundation
Alireza Shooshtari,Soheil Razavi +1 more
TL;DR: In this paper, the authors studied the nonlinear and linear free vibration of symmetrically laminated magneto-electro-elastic doubly-curved thin shell resting on an elastic foundation.
References
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Book
Introduction to perturbation techniques
TL;DR: In this paper, the authors introduce the notion of forced Oscillations of the Duffing Equation and the Mathieu Equation for weakly nonlinear systems with quadratic and cubic nonlinearities.
Book
Nonlinear Vibrations and Stability of Shells and Plates
TL;DR: In this article, a comparison of different shell theories for nonlinear vibrations and stability of circular cylindrical shells is presented. But the authors do not consider the effect of boundary conditions on the large-amplitude vibrations of circular cylinders.
Journal ArticleDOI
A modified Lindstedt-Poincaré method for certain strongly non-linear oscillators☆
Y.K. Cheung,S.H. Chen,S.L. Lau +2 more
TL;DR: In this paper, an elliptic Lindstedt-Poincare (L--P) method is presented for the steady-state analysis of strongly non-linear oscillators of the form\(\ddot x + c_1 x +c_3 x^3 = \varepsilon f(x,\dot x)\), in which the Jacobian elliptic functions are employed instead of the usual circular functions in the classical L--P perturbation procedure.
Journal ArticleDOI
A new non-linear higher-order shear deformation theory for large-amplitude vibrations of laminated doubly curved shells
Marco Amabili,J. N. Reddy +1 more
TL;DR: In this paper, a consistent higher-order shear deformation non-linear theory is developed for shells of generic shape, taking geometric imperfections into account, and geometrically nonlinear strain-displacement relationships are derived retaining full nonlinear terms in the in-plane displacements; they are presented in curvilinear coordinates in a formulation ready to be implemented.
Journal ArticleDOI
An Elliptic Lindstedt--Poincaré Method for Certain Strongly Non-Linear Oscillators
S. H. Chen,Y.K. Cheung +1 more
TL;DR: In this paper, an elliptic Lindstedt-Poincare (L--P) method is presented for the steady-state analysis of strongly non-linear oscillators of the form f(x,\dot x) = (c_0 - c_2 x^2 )