The General Solution for Torsional Circular Shaft of Cubic Quasicrystal
(0) Gregorys decomposed theorem of isotropic plate is extended to investigate torsional circular shaft of cubic quasicrystal with homogeneous boundary conditions, and the theory of equivalence that Chengs refined theory and Gregorys decomposed theorem is extended to the cylindrical coordinate. The general solution of torsional circular shaft on cubic quasicrystal with homogeneous boundary conditions is proposed on the basis of the classical elasticity theory and stress-displacement relations of cubic quasicrystal without ad hoc assumptions. At first expressions are obtained for all the displacements and stress components in term of some ID functions. Using Lure method, the exact equations were given. And the exact equations for the torsional circular shaft on cubic quasicrystal without surface loadings consist of four governing differential equations: two harmonic equations and two transcendental equations. Using basic mathematic method and the general solutions, an example is examined.
cubic quasicrystal mechanical behavior the general solution the torsional deformation the circular shaft
BAO-SHENG ZHAO JIA-LIAN SHI YING-TAO ZHAO YANG GAO
School of Mechanical Engineering, University of Science and Technology Liaoning, Anshan,114051, PR C Department of Applied Mechanics, School of Aerospace Engineering, Beijing Institute of Technology, B College of Science, China Agricultural University, Beijing, 100083, PR China
国际会议
2011 International Conference on Advanced Material Research(ICAMR 2011)(2011年先进材料研究国际会议)
重庆
英文
206-210
2011-01-21(万方平台首次上网日期,不代表论文的发表时间)