论文信息 - The theory of orthotropic viscoelastic shear deformable composite flat panels and their dynamic stability

The theory of orthotropic viscoelastic shear deformable composite flat panels and their dynamic stability

Abstract This paper deals with an exact approach to the dynamic stability of orthotropic sheardeformable viscoelastic flat plates subjected to in-plane uni/biaxial edge load systems. In deriving the associated governing equations a Boltzmann hereditary law is used and in addition transverse shear deformation, transverse normal stress and rotatory inertia effects are incorporated. The integro-differential equations governing the stability of simply-supported flat plates are solved in the Laplace transform (LT) space in order to determine the critical in-plane edge loads yielding the asymptotic instability of flat plates. The stability analysis allows one to obtain the nature of the loss of stability i.e. either by divergence or by flutter. Numerical applications are presented and pertinent conclusions are formulated.

N. K. Chandiramani | Liviu Librescu | Jacob Aboudi | L. Librescu | J. Aboudi

[1] R. Bellman,et al. A NUMERICAL INVERSION OF THE LAPLACE TRANSFORM , 1963 .

[2] R. Christensen,et al. Theory of Viscoelasticity , 1971 .

[3] A Numerical Solution for the Problem of an Impacted Fiber-Reinforced Viscoelastic Half-Space, , 1974 .

[4] Dale W. Wilson,et al. Viscoelastic analysis of laminated plate buckling , 1984 .

[5] Jacob Aboudi,et al. Effective behavior of inelastic fiber-reinforced composites , 1984 .

[6] Jacob Aboudi,et al. Elastoplasticity theory for composite materials , 1986 .

[7] Dynamic stability of shear deformable viscoelastic composite plates , 1987 .

[8] Liviu Librescu,et al. Elastostatics and Kinetics of Anisotropic and Heterogeneous Shell-Type Structures , 1975 .

[9] E. Infante,et al. Stability Criteria for Linear Dynamical Systems , 1971 .

[10] Jacob Aboudi,et al. Closed form constitutive equations for metal matrix composites , 1987 .