Jacobi–Ritz method for free vibration analysis of uniform and stepped circular cylindrical shells with arbitrary boundary conditions: A unified formulation

• Published in: Computers & mathematics with applications (1987) Vol. 77; no. 2; pp. 427 - 440
• Main Authors: Li, Haichao, Pang, Fuzhen, Miao, Xuhong, Li, Yuhui
• Format: Journal Article
• Language: English
• Published: Oxford Elsevier Ltd 15.01.2019; Elsevier BV
• Subjects: A semi analytical method; Boundary conditions; Circularity; Convergence; Cylindrical shells; Fourier series; Free vibration; Functions (mathematics); Mathematical models; Multi-segment partitioning strategy; Parameters; Penalty method; Polynomials; Ritz method; Shell theory; Shells; Thin walled shells; Uniform and stepped circular cylindrical; Vibration analysis; A semi analytical method; Free vibration; Multi-segment partitioning strategy; Penalty method; Uniform and stepped circular cylindrical
• ISSN: 0898-1221; 1873-7668
• DOI: 10.1016/j.camwa.2018.09.046

A semi analytical approach is employed to analyze free vibration characteristics of uniform and stepped circular cylindrical shells subject to arbitrary boundary conditions. The analytical model is established on the basis of multi-segment partitioning strategy and Flügge thin shell theory. The admissible displacement functions are handled by unified Jacobi polynomials and Fourier series. In order to obtain continuous conditions and satisfy arbitrary boundary conditions, the penalty method about the spring technique is adopted. The solutions about free vibration behavior of circular cylindrical shells were obtained by approach of Rayleigh–Ritz. To confirm the reliability and accuracy of this method, convergence study and numerical verifications for circular cylindrical shells subject to different boundary conditions, Jacobi parameters, spring parameters and maximum degree of permissible displacement function are carried out. Through comparative analyses, it is obvious that the present method has a good stable and rapid convergence property and the results of this paper agree closely with the published literature. In addition, some interesting results about the geometric dimensions are investigated.