A theory of latticed plates and shells
Title:
A theory of latticed plates and shells
Author:
Pshenichnov, G. I.
ISBN:
9781615838707
9789812797100
Personal Author:
Publication Information:
Singapore ; River Edge, NJ : World Scientific, c1993.
Physical Description:
1 online resource (xi, 309 p.) : ill.
Series:
Series on advances in mathematics for applied sciences ; v. 5
Series on advances in mathematics for applied sciences ; v. 5.
Contents:
1. Reticulated shell theory: equations. 1.1. Anisotropic shell theory: basic equations -- 1.2. Constitutive equations in the reticulated shell theory -- 1.3. More precise constitutive equations in the reticulated shell theory -- 2. Decomposition method. 2.1. Solution of equations and boundary value problems by the decomposition method -- 2.2. Application of the decomposition method for particular problems -- 3. Statics. 3.1. Plane problem -- 3.2. Bending of plates -- 3.3. Shallow shells -- 3.4. Small parameter method in the shallow shell theory -- 3.5. Circular cylindrical shells -- 3.6. Optimum design of a shell with an orthogonal lattice -- 3.7. Shells of rotation -- 3.8. Momentless theory -- 3.9. Simple edge effect in the reticulated shell theory -- 3.10. A new method for solving nonlinear problems -- 4. Stability. 4.1. Stability of plates -- 4.2. Stability of cylindrical shells and shells of rotation -- 5. Vibration. 5.1. Free and parametric vibrations of plates -- 5.2. Free and forced vibrations of shallow shells -- 5.3. Free vibrations of closed cylindrical shells -- 5.4. Vibrations of shells of rotation -- 6. Multilayer systems. 6.1. Structural coatings -- 6.2 Ribbed and multilayer reticulated shells and plates.
Abstract:
The book presents the theory of latticed shells as continual systems and describes its applications. It analyses the problems of statics, stability and dynamics. Generally, a classical rod deformation theory is applied. However, in some instances, more precise theories which particularly consider geometrical and physical nonlinearity are employed. A new effective method for solving general boundary value problems and its application for numerical and analytical solutions of mathematical physics and reticulated shell theory problems is described. A new method of solving the shell theory's nonlinear problems, substantially simplifying the existing algorithms is given. Questions of optimum design are discussed. Some of the findings are generalized and extended to edged and composite systems. The results of the solutions of a wide range of pressing problems are presented.
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Electronic Access:
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