Setting up a theory of stability of fibrous and laminated composites

被引:4
作者
Guz A.N. [1 ]
机构
[1] S. P. Timoshenko Institute of Mechanics, National Academy of Sciences of Ukraine, Kyiv 03057
来源
International Applied Mechanics | 2009年 / 45卷 / 06期
关键词
Equiphase plane; Fibrous and laminated composites; Linearized three-dimensional theory of stability of deformable bodies; Theory of stability;
D O I
10.1007/s10778-009-0216-5
中图分类号
学科分类号
摘要
The results obtained in setting up a theory of stability of fibrous and laminated composites in the case where the plane Π is in an arbitrary position are analyzed. The plane Π is formed by the points of a buckling mode that have equal phases relative to the line of compression. This theory follows from the linearized three-dimensional theory of stability of deformable bodies and is used to determine the critical compressive load and the associated position of the plane Π. Numerical examples are presented. A brief historical sketch is given. © 2009 Springer Science+Business Media, Inc.
引用
收藏
页码:587 / 612
页数:25
相关论文
共 63 条
[1]  
Guz A.N., On setting up a stability theory of unidirectional fibrous materials, Int. Appl. Mech., 5, 2, pp. 156-162, (1969)
[2]  
Guz A.N., Determining the theoretical compressive strength of reinforced materials, Dokl. AN USSR, Ser. A, 3, pp. 236-238, (1969)
[3]  
Guz A.N., Stability of Three-dimensional Deformable Bodies [In Russian], (1971)
[4]  
Guz A.N., Stability of Elastic Bodies under Finite Deformation [in Russian], (1973)
[5]  
Guz A.N., Fundamentals of the Three-Dimensional Theory of Stability of Deformable Bodies [In Russian], (1986)
[6]  
Guz A.N., Elastic Waves in Prestressed Bodies [in Russian], (1986)
[7]  
Guz A.N., Fracture Mechanics of Composites under Compression [in Russian], (1990)
[8]  
Guz A.N., Elastic Waves in Bodies with Initial (Residual) Stresses [in Russian], (2004)
[9]  
Guz A.N., Golovchan V.T., Diffraction of Elastic Waves in Multiply Connected Bodies [in Russian], (1972)
[10]  
Guz A.N., Dekret V.A., Kokhanenko Yu V., Plane problems of stability of composite materials with a finite-size filler, Mech. Comp. Mater., 36, 1, pp. 49-54, (2000)
1234567