Longitudinal vibrations of an elastically connected double-rod complex system. Part I, Free vibrations

• Autorzy: Oniszczuk Z.
• Konferencja: Symposium “Vibrations In Physical Systems” (22 ; 19-22.04.2006 ; Będlewo koło Poznania, Polska)
• Języki publikacji: EN

Słowa kluczowe

EN

longitudinal vibrations; linear vibration theory; transverse vibrations; free vibration; double-rod complex system

PL

drgania wzdłużne; liniowa teoria wibracji; drgania poprzeczne; drgania swobodne

• Wydawca: Poznan University of Technology. Institute of Applied Mechanics
• Czasopismo: Vibrations in Physical Systems
• Rocznik: 2006
• Tom: Vol. 22
• Strony: 291--296
• Opis fizyczny: Bibliogr. 22 poz.

Twórcy

autor

Oniszczuk Z.

• Rzeszów University of Technology, ul. W. Pola 2, 35-959 Rzeszów, tel.:(017)8651377

Bibliografia

• [1] S. Ziemba, Vibration Analysis, Vol. II, PWN, Warsaw, 1959 (in Polish).
• [2] W. Nowacki, Dynamics of Elastic Systems, Chapman and Hall, London, 1963.
• [3] S. Kaliski, Vibrations and Waves in Solids, IPPT PAN, Warsaw, 1966 (in Polish).
• [4] E. Skudrzyk, Simple and Complex Vibratory Systems, The Pennsylvania State University Press, University Park, PA, 1968.
• [5] S.S. Rao, Mechanical Vibrations, Addison-Wesley, Reading, MA, 1995.
• [6] C.W. de Silva, Vibration: Fundamentals and Practice, CRC Press, London, 1999.
• [7] J.H. Ginsberg, Mechanical and Structural Vibrations: Theory and Applications, Wiley, New York, 2001.
• [8] Z. Oniszczuk, Vibration Analysis of Compound Continuous Systems with Elastic Constraints, Publishing House of Rzeszów University of Technology, Rzeszów, 1997 (in Polish).
• [9] Z. Oniszczuk, Transverse vibrations of elastically connected double-string complex system, Part I: free vibrations, Journal of Sound and Vibration, 232 (2000) 355-366.
• [10] Z. Oniszczuk, Free longitudinal vibrations of an elastically connected double-rod system, Proceedings of the XIIth Symposium on Dynamics of Structures, Rzeszów-Bystre. Scientific Works of Rzeszów University of Technology 222, Mechanics 65 (2005) 303-310.
• [11] S. Kukla, J. Przybylski, L. Tomski, Longitudinal vibration of rods coupled by translational springs, Journal of Sound and Vibration, 185 (1995) 717-722.
• [12] V. Mermertaş, M. Gürgöze, Longitudinal vibrations of rods coupled by a double spring-mass system, Journal of Sound and Vibration, 202 (1997) 748-755.
• [13] M. Gürgöze, Alternative formulations of the frequency equation of longitudinally vibrating rods coupled by a double spring-mass system, Journal of Sound and Vibration, 208 (1997) 331-338.
• [14] Q.S. Li, G.Q. Li, D.K. Liu, Exact solutions for longitudinal vibration of rods coupled by translational springs, International Journal of Mechanical Sciences, 42 (2000) 1135-1152.
• [15] S. Inceoğlu, M. Gürgöze, Longitudinal vibrations of rods coupled by several springmass systems, Journal of Sound and Vibration, 234 (2000) 895-905.
• [16] H. Erol, M. Gürgöze, Longitudinal vibrations of a double-rod system coupled by springs and dampers, Journal of Sound and Vibration, 276 (2004) 419-430.
• [17] G. Jemielita, W. Szcześniak, The foundation models, Scientific Works of Warsaw University of Technology, Civil Engineering, 120 (1993) 5-49 (in Polish).
• [18] Z. Oniszczuk, Free transverse vibrations of elastically connected simply supported double-beam complex system, Journal of Sound and Vibration, 232 (2000) 387-403.
• [19] Z. Oniszczuk, Free transverse vibrations of an elastically connected complex beamstring system, Journal of Sound and Vibration, 254 (2002) 703-715.
• [20] H.F. Weinberger, Partial Differential Equations, Wiley, New York, 1976.
• [21] A.D. Polyanin, Handbook of Linear Partial Differential Equations for Engineers and Scientists, CRC Press, London, 2002.
• [22] G. Birkhoff, G.-C. Rota, Ordinary Differential Equations, Wiley, New York, 1989.