K. Vijayakumar, "Modified Kirchhoff's theory of plates including transverse shear deformations". Mechanics Research Communications 04/2011; 38(3):211-213. DOI: 10.1016/j.mechrescom.2011.02.007Vijayakumar, K (2011) Modified Kirchhoff’s theory of plates including transverse shear deformations. Mech...
Kirchhoff Theory 下载积分: 9950 内容提示: 5THIN PLATES.KIRCHHOFF THEORY5.1 INTRODUCTIONThis chapter introduces the study of structures formed by “thin surfaces”such as plates and shells. Plates will be studied in this and the two fol-lowing chapters. Shell structures formed by assembly of f l...
In the Kirchhoff–Love theory of plates in bending it was assumed that the straight lines perpendicular to the undeformed reference surface remain straight and perpendicular to it after deformation [23]. The displacement field expressed by (4) may be written as (6)n=1,U1i={−∂w0∂x,...
Justification of the Nonlinear Kirchhoff-Love Theory of Plates as the Application of a New Singular Inverse Method In the framework of isotropic homogeneous nonlinear elasticity for a St. Venant-Kirchhoff material, we consider a three-dimensional plate of thickness and... R Monneau - 《Archive for...
Brief biographies of 260 protagonists of theory of structures H. Argyris, M. J. Turner, R. W. Clough, T. v. Kármán, O. C. Zienkiewicz and K. Zuse, are also covered by detailed biographies... K Kurrer 被引量: 0发表: 2018年 History of the Finite Element Method - Mathematics Meets...
The Kirchhoff–Love shell theory is recasted in the frame of the tangential differential calculus (TDC) where differential operators on surfaces are formulated based on global, three-dimensional coordinates. As a consequence, there is no need for a parametrization of the shell geometry implying curvi...
1959: Theory of plates and shells. 2nd Ed. New York: McGraw-Hill Google Scholar Tottenham, H. 1979: The boundary element method for plates and shells. In: Banerjee, P. K.; Butterfield, R. (eds.), developments in boundary element methods, London: Applied Science Publishers Ltd. Google ...
The Kirchhoff diffraction integral is the foundation for the scalar diffraction theory where the vector character, that is, the polarization of the light wave, is neglected, and the distance between the plane of observation and the diffracting plane is considered to be much larger than the waveleng...
A mathematical justification of the well-known two-dimensional linear Kirchhoff-Love theory of plates, by means of convergence theorems as the thickness of the plate approaches zero. A systematic derivation of two-dimensional plate models ... PG Ciarlet - 《Studies in Mathematics & Its Applications...
of the reflector,then to determine the amplitude distortion factor,and finally to correct the demigration amplitude according to the fact that the amplitude distortion factor in demigration is equal to one at a reflection point.In practical implementation of high fidelity demigration,we use four ...