Identyfikatory
Warianty tytułu
Języki publikacji
Abstrakty
Free vibration analysis of homogeneous and isotropic annular thin plates by using Green’s functions is considered. The formula of the influence function for uniform thin circular and annular plates is presented in closed-form. The limited independent solutions of differential Euler equation were expanded in the Neumann power series based on properties of integral equations. The analytical frequency equations as power series were obtained using the method of successive approximations. The natural axisymmetric frequencies for singularities when the core radius approaches zero are calculated. The results are compared with selected results presented in the literature.
Rocznik
Tom
Strony
939--951
Opis fizyczny
Bibliogr. 15 poz., wykr.
Twórcy
autor
- Faculty of Management Bialystok University of Technology, 2 Ojca Stefana Tarasiuka St., 16-001 Kleosin, POLAND
Bibliografia
- [1] Gabrielson T.B. (1999): Frequency constants for transverse vibration of annular discs. – Journal of the Acoustical Society of America, vol.105, pp.3311-3317.
- [2] Kim C.S. and Dickinson S.M. (1989): On the lateral vibration of thin annular and circular composite plates subject to certain complicating effects. – Journal of Sound and Vibration, vol.130, pp.363-377.
- [3] Kukla S. (2009): Green’s functions and their properties. – Czestochowa University of Technology, Poland.
- [4] Kukla S. and Szewczyk M. (2007): Frequency analysis of annular plates with elastic concentric supports by using a Green’s function method. – Journal of Sound and Vibration, vol.300, pp.387-393.
- [5] Leissa A.W. (1969): Vibration of Plates. – Washington.
- [6] Liu Ch., Chen T. and Hwang Ch. (2000): Effect of satisfying stress boundary conditions in the axisymmetric vibration analysis of circular and annular plates. – International Journal of Solids and Structures, vol.38, pp.7559-7569.
- [7] Ramaiah G.K. (1980): Flexural vibrations of annular plates under uniform in-plane compressive forces. – Journal of Sound and Vibration, vol.70, 117-131.
- [8] Taher H.R., Omidi M., Zadpoor A.A. and Nikooyan A.A. (2006): Free vibration of circular and annular plates with variable thickness and different combinations of boundary conditions. – Journal of Sound and Vibration, vol.296, pp.1084-1092.
- [9] Tricomi F.G. (1957): Integral Equations. – New York.
- [10] Wang C.Y. (2014): The vibration modes of concentrically supported free circular plates. – Journal of Sound and Vibration, vol.333, pp.835-847.
- [11] Wang C.Y. and Wang C.M. (2005): Examination of the fundamental frequencies of annular plates with small core. – Journal of Sound and Vibration, vol.280, pp.3-5, pp.1116-1124.
- [12] Wang X., Striz A.G. and Bert C.W. (1993): Free vibration analysis of annular plates by the DQ method. – Journal of Sound and Vibration, vol.164, pp.173-175.
- [13] Vera S.A., Sanchez M.D., Laura P.A.A. and Vega D.A. (1998): Transverse vibrations of circular, annular plates with several combinations of boundary conditions. – Journal of Sound and Vibration, vol.213, pp.757-762.
- [14] Vogel S.M. and Skinner D.W. (1965): Natural frequencies of transversally vibrating uniform annular plates. – Journal of Applied Mechanics, vol.32, pp.926-931.
- [15] Zhou Z.H., Wong K.W., Xu X.S. and Leung A.Y.T. (2011): Natural vibration of circular and annular plates by Hamiltonian Approach. – Journal of Sound and Vibration, vol.330, No.5, pp.1005-1017.
Typ dokumentu
Bibliografia
Identyfikator YADDA
bwmeta1.element.baztech-fb883661-e5a9-4f95-a612-9ea1345e1e52