论文信息 - Two-dimensional approximations of three-dimensional eigenvalue problems in plate theory

Two-dimensional approximations of three-dimensional eigenvalue problems in plate theory

The eigenvalues and eigenfunctions corresponding to the three-dimensional equations for the linear elastic equilibrium of a clamped plate of thickness 2ϵ, are shown to converge (in a specific sense) to the eigenvalues and eigenfunctions of the well-known two-dimensional biharmonic operator of plate theory, as ϵ approaches zero. In the process, it is found in particular that the displacements and stresses are indeed of the specific forms usually assumed a priori in the literature. It is also shown that the limit eigenvalues and eigenfunctions can be equivalently characterized as the leading terms in an asymptotic expansion of the three-dimensional solutions, in terms of powers of ϵ. The method presented here applies equally well to the stationary problem of linear plate theory, as shown elsewhere by P. Destuynder.

Philippe G. Ciarlet | P. G. Ciarlet | P. Ciarlet | S. Kesavan | S. Kesavan

[1] P. J. Davis,et al. Introduction to functional analysis , 1958 .

[2] Philippe G. Ciarlet,et al. A justification of the von Kármán equations , 1980 .

[3] J. Nédélec,et al. The effect of a thin inclusion of high rigidity in an elastic body , 1980 .

[4] S. Kesavan. Homogenization of elliptic eigenvalue problems: Part 1 , 1979 .

[5] G. Strang,et al. An Analysis of the Finite Element Method , 1974 .

[6] J. Lions,et al. Les inéquations en mécanique et en physique , 1973 .

[7] Philippe G. Ciarlet,et al. JUSTIFICATION OF THE TWO-DIMENSIONAL LINEAR PLATE MODEL. , 1979 .

[8] Philippe G. Ciarlet,et al. A Justi cation of a Nolinear Model in Plate Theory , 1979 .

[9] J. Lions. Perturbations Singulières dans les Problèmes aux Limites et en Contrôle Optimal , 1973 .

[10] B. M. Fraeijs de Veubeke,et al. A Course in Elasticity , 1979 .