Dynamics of a Rigid Rotor Linear/Nonlinear Bearings System Subject to Rotating Unbalance and Base Excitations

Rotating machinery support excitations can occur if a machine is installed on a base prone to ground motions or on-board moving systems such as ships and aircraft. This paper presents a formulation for the dynamic analysis of rigid rotors subject to base excitations plus mass imbalance. The formulation allows for six motions at the machine base and takes into account the linear/nonlinear spring characteristics of the supporting bearings. Equations of motion are derived using Lagrange’s equations. For rotor—linear bearing systems subject to mass imbalance plus harmonic excitations along or around lateral directions, analytical solutions for equations of motion are derived and analytical results in the time domain are compared with their counterparts obtained by numerical integration using the Runge—Kutta method and typical agreement is obtained. The system natural frequencies as affected by rotor speed are obtained using the QR algorithm using the DAMRO-1 program and compared with those obtained by MATLAB and excellent agreement is obtained. The frequency response (maximum amplitude of vibrations against the base excitation frequency) is characterized by peaks at natural frequencies of the rotating gyroscopic system. This necessitates extreme precaution when we design such rotating systems that are prone to base motions and mass imbalance. For systems with bearing cubic nonlinearity, results are obtained by numerical integration and discussed with regards to the time domain, fast Fourier transform (FFT) and Poincaré map. Periodic and quasi-periodic disk/bearings motions are observed. For systems with support cubic nonlinearity and subject to mass imbalance and base excitation, the FFT of disk horizontal and vertical vibrations is marked with sum and difference tones, ±nfb ± fs (n + m is always odd) where fs is the rotating unbalance frequency and fb is base excitation frequency.

[1]  Christophe Pierre,et al.  Stability of gyroscopic systems , 1999 .

[2]  Cai-Wan Chang-Jian,et al.  Chaos and bifurcation of a flexible rub-impact rotor supported by oil film bearings with nonlinear suspension , 2007 .

[3]  F. M. A. El-Saeidy Dynamics of Machinery 2D Elastic Casing with Central Hole Subject to an In-Plane Deflection Dependent Rotating Load , 2000 .

[4]  Z. Ge,et al.  Bifurcations and chaos in a rate gyro with harmonic excitation , 1996 .

[5]  Erwin Krämer,et al.  Dynamics of Rotors and Foundations , 1993 .

[6]  K. Kimura,et al.  Vibration analysis of a high speed and light weight rotor system subjected to a pitching or turning motion: II: A flexible rotor system on flexible suspensions , 1995 .

[7]  Vibration Problems , 1946, Nature.

[8]  R. Gasch,et al.  Vibration of large turbo-rotors in fluid-film bearings on an elastic foundation , 1976 .

[9]  H. Ziegler Principles of structural stability , 1968 .

[10]  Jean W. Zu,et al.  An Improved Transfer Matrix Method for Steady-State Analysis of Nonlinear Rotor-Bearing Systems , 2002 .

[11]  V. M. Kuz'ma Resonant modes of a gyroscope on a randomly vibrating base , 1980 .

[12]  T. Ikeda,et al.  Summed-and-Differential Harmonic Oscillations of an Unsymmetrical Shaft , 1981 .

[13]  Yukio Ishida,et al.  Nonlinear Forced Oscillations Caused by Quartic Nonlinearity in a Rotating Shaft System , 1990 .

[14]  An-Chen Lee,et al.  STEADY-STATE ANALYSIS OF A ROTOR MOUNTED ON NONLINEAR BEARINGS BY THE TRANSFER-MATRIX METHOD , 1993 .

[15]  Bijan Samali,et al.  Random Vibration of Rotating Machines under Earthquake Excitations , 1986 .

[16]  G. Adiletta,et al.  Chaotic motions of a rigid rotor in short journal bearings , 1996 .

[17]  R. F. Ganiev,et al.  Stability of a gyroscope on a vibrating base in resonance conditions , 1972 .

[18]  Fawzi M. A. El-Saeidy,et al.  Finite-Element Dynamic Analysis of a Rotating Shaft with or without Nonlinear Boundary Conditions Subject to a Moving Load , 2000 .

[19]  Yukio Ishida NONLINEAR OSCILLATIONS OF ROTORS , 1999 .

[20]  Jean W. Zu,et al.  Steady-State Response of Continuous Nonlinear Rotor-Bearing Systems Using Analytical Approach , 1998 .

[21]  Yukio Hori,et al.  Earthquake-Induced Instability of a Rotor Supported by Oil Film Bearings , 1990 .

[22]  Yukio Ishida,et al.  Oscillations of a Rotating Shaft with Symmetrical Nonlinear Spring Characteristics , 1975 .

[23]  Yukio Ishida,et al.  Subharmonic and Summed-and-Differential Harmonic Oscillations of an Unsymmetrical Rotor , 1981 .

[24]  Yukio Ishida,et al.  Forced oscillations of a rotating shaft with nonlinear spring characteristics and internal damping (1/2 order subharmonic oscillations and entrainment) , 1993 .

[25]  F. M. A. El-Saeidy Dynamics of a 2D Elastic Machinery Casing, with a Central Hole, Subject to an In-Plane Deflection-Dependent Rotating Load , 2001 .

[26]  Zheng-Ming Ge,et al.  Stability of a rate gyro , 1992 .

[27]  Luis E. Suarez,et al.  Seismic response of rotating machines , 1992 .

[28]  el-Saeidy Rotating machinery dynamics simulation. I. Rigid systems with ball bearing nonlinearities and outer ring ovality under rotating unbalance excitation , 2000, The Journal of the Acoustical Society of America.

[29]  W. Sarfeld,et al.  Soil influence on unbalance response and stability of a simple rotor-foundation system , 1984 .

[30]  Fawzi M. A. El-Saeidy Effect of tooth backlash and ball bearing deadband clearance on vibration spectrum in spur gear boxes , 1991 .

[31]  Fawzi M.A. El-Saeidy Finite Element Modeling of a Rotor Shaft Rolling Bearings System With Consideration of Bearing Nonlinearities , 1998 .

[32]  A. H. Soni,et al.  Seismic Analysis of a Gyroscopic Mechanical System , 1983 .

[33]  Cesare Rossi,et al.  Non-periodic motions of a Jeffcott rotor with non-linear elastic restoring forces , 1996 .

[34]  Samuel Doughty Response of single degree of freedom mechanisms to base excitation , 2001 .

[35]  Fawzi M. A. El-Saeidy Finite-element vibration analysis of a cantilever plate with a central circular hole subject to an in-plane moving (rotating) load , 2001 .

[36]  Heng-Hui Chen Chaotic and non-linear dynamic analysis of a two-axis rate gyro with feedback control mounted on a space vehicle , 2003 .