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Three-dimensional nonlinear vibrations of composite beams — I. Equations of motion (1990)

Pai, Perngjin F. ; Nayfeh, Ali H.

Springer

Nonlinear dynamics 1 (1990), S. 477-502

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ISSN: 1573-269X

Keywords: Composite beams ; flexural-flexural-torsional-extensional vibrations ; nonlinear equations of motion

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics

Notes: Abstract Newton's second law is used to develop the nonlinear equations describing the extensional-flexural-flexural-torsional vibrations of slewing or rotating metallic and composite beams. Three consecutive Euler angles are used to relate the deformed and undeformed states. Because the twisting-related Euler angle ϕ is not an independent Lagrangian coordinate, twisting curvature is used to define the twist angle, and the resulting equations of motion are symmetric and independent of the rotation sequence of the Euler angles. The equations of motion are valid for extensional, inextensional, uniform and nonuniform, metallic and composite beams. The equations contain structural coupling terms and quadratic and cubic nonlinearities due to curvature and inertia. Some comparisons with other derivations are made, and the characteristics of the modeling are addressed. The second part of the paper will present a nonlinear analysis of a symmetric angle-ply graphite-epoxy beam exhibiting bending-twisting coupling and a two-to-one internal resonance.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01856950

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A nonlinear composite shell theory (1992)

Pai, Perngjin F. ; Nayfeh, Ali H.

Springer

Nonlinear dynamics 3 (1992), S. 431-463

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ISSN: 1573-269X

Keywords: Anisotropic shell ; geometric nonlinearity ; third-order shear deformation theory ; extension-bending-shear vibrations ; general nonlinear equations of motion

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics

Notes: Abstract A general nonlinear theory for the dynamics of elastic anisotropic circular cylindrical shells undergoing small strains and moderate-rotation vibrations is presented. The theory fully accounts for extensionality and geometric nonlinearities by using local stress and strain measures and an exact coordinate transformation, which result in nonlinear curvatures and strain-displacement expressions that contain the von Karman strains as a special case. Moreover, the linear part of the theory contains, as special cases, most of the classical linear theories when appropriate stress resultants and couples are defined. Parabolic distributions of the transverse shear strains are accounted for by using a third-order theory and hence shear correction factors are not required. Five third-order nonlinear partial differential equations describing the extension, bending, and shear vibrations of shells are obtained using the principle of virtual work and an asymptotic analysis. These equations show that laminated shells display linear elastic and nonlinear geometric couplings among all motions.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF00045647

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A nonlinear composite beam theory (1992)

Pai, Perngjin F. ; Nayfeh, Ali H.

Springer

Nonlinear dynamics 3 (1992), S. 273-303

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ISSN: 1573-269X

Keywords: Composite beams ; geometric nonlinearity ; third-order shear deformation theory ; extensional-flexural-flexuraltorsional-shearing-shearing vibrations

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics

Notes: Abstract Presented here is a general theory for the three-dimensional nonlinear dynamics of elastic anisotropic initially straight beams undergoing moderate displacements and rotations. The theory fully accounts for geometric nonlinearities (large rotations and displacements) by using local stress and strain measures and an exact coordinate transformation, which result in nonlinear curvature and strain-displacement expressions that contain the von Karman strains as a special case. Extensionality is included in the formulation, and transverse shear deformations are accounted for by using a third-order theory. Six third-order nonlinear partial-differential equations are derived for describing one extension, two bending, one torsion, and two shearing vibrations of composite beams. They show that laminated beams display linear elastic and nonlinear geometric couplings among all motions. The theory contains, as special cases, the Euler-Bernoulli theory, Timoshenko's beam theory, the third-order shear theory, and the von Karman type nonlinear theory.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF00045486

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