Single-mode control and chaos of cantilever beam under primary and principal parametric excitations

A non-linear control law is proposed to suppress the vibrations of the first mode of a cantilever beam when subjected to primary and principal parametric excitations. The dynamics of the beam are modeled with a second-order non-linear ordinary-differential equation. The model accounts for viscous damping air drag, and inertia and geometric non-linearities. A control law based on quantic velocity feedback is proposed. The method of multiple scales method is used to derive two-first ordinary differential equations that govern the evolution of the amplitude and phase of the response. These equations are used to determine the steady state responses and their stability. Amplitude and phase modulation equations as well as external force–response and frequency–response curves are obtained. Numerical simulations confirm this scenario and detect chaos and unbounded motions in the instability regions of the periodic solutions.

[1]  Ali H. Nayfeh,et al.  Three-to-One Internal Resonances in Hinged-Clamped Beams , 1997 .

[2]  M. F. Golnaraghi,et al.  Experimental implementation of the internal resonance control strategy , 1996 .

[3]  H. Hatwal,et al.  Non-linear vibrations of a harmonically excited autoparametric system , 1982 .

[4]  Giuseppe Rega,et al.  Non-linearity, bifurcation and chaos in the finite dynamics of different cable models , 1996 .

[5]  A. El-Bassiouny Structural Modal Interactions with Internal Resonances and External Excitation , 2005 .

[6]  M. F. Golnaraghi,et al.  Development of a generalised active vibration suppression strategy for a cantilever beam using internal resonance , 1994, Nonlinear Dynamics.

[7]  Subharmonic responses in harmonically excited rectangular plates with one-to-one internal resonance , 1997 .

[8]  Principal parametric resonances of non-linear mechanical system with two-frequency and self-excitations , 2005 .

[9]  Resonance of Non-Linear Systems Subjected to Multi-Parametrically Excited Structures: (Comparison Between two Methods, Response and Stability) , 2004 .

[10]  A. Nayfeh,et al.  Nonlinear resonances in a class of multi-degree-of-freedom systems , 1975 .

[11]  S. H. A. Chen,et al.  On the internal resonance of multi-degree-of-freedom systems with cubic non-linearity , 1989 .

[12]  A. H. Nayfeh,et al.  The response of nonlinear systems to modulated high-frequency input , 1995 .

[13]  Y. El‐Dib Instability of parametrically second- and third-subharmonic resonances governed by nonlinear Shrödinger equations with complex coefficients , 2000 .

[14]  Y. El‐Dib A parametric nonlinear Schrödinger equation and stability criterion , 1995 .

[15]  A. F. El-Bassiouny,et al.  Modal interaction of resonantly forced oscillations of two-degree-of-freedom structure , 2003, Appl. Math. Comput..

[16]  A. Bajaj,et al.  Resonant vibrations in harmonically excited weakly coupled mechanical systems with cyclic symmetry , 2000 .

[17]  A. H. Nayfeh,et al.  The Non-Linear Response of a Slender Beam Carrying a Lumped Mass to a Principal Parametric Excitation: Theory and Experiment , 1989 .

[18]  Hongjun Cao Primary resonant optimal control for homoclinic bifurcations in single-degree-of-freedom nonlinear oscillators , 2005 .

[19]  George Haller,et al.  Quasiperiodic oscillations in robot dynamics , 1995, Nonlinear Dynamics.

[20]  H. Hatwal,et al.  Notes on an Autoparametric Vibration Absorber , 1982 .

[21]  A. H. Nayfeh,et al.  Adaptive Control of Flexible Structures Using a Nonlinear Vibration Absorber , 2002 .

[22]  Dora E. Musielak,et al.  Chaos and routes to chaos in coupled Duffing oscillators with multiple degrees of freedom , 2005 .

[23]  K. R. Asfar,et al.  Damping of parametrically excited single-degree-of-freedom systems , 1994 .

[24]  A. Nayfeh,et al.  Combination resonances in the response of the duffing oscillator to a three-frequency excitation , 1998 .

[25]  A F El-Bassiouny,et al.  Internal Resonance of a Nonlinear Vibration Absorber , 2005 .

[26]  K. Alsaif Investigation of the dynamic response of a nonlinear semi-definite mechanical system , 2003 .

[27]  Periodic behavior for the parametrically excited Boussinesq equation , 2004 .

[28]  P.J.Th. Venhovens,et al.  Investigation on Stability and Possible Chaotic Motions in the Controlled Wheel Suspension System , 1992 .

[29]  Zhujun Jing,et al.  Complex dynamics in Duffing system with two external forcings , 2005 .

[30]  Jianping Cai,et al.  Comparison of multiple scales and KBM methods for strongly nonlinear oscillators with slowly varying parameters , 2004 .

[31]  A. F. El-Bassiouny,et al.  Dynamics of a single-degree-of-freedom structure with quadratic, cubic and quartic non-linearities to a harmonic resonance , 2003, Appl. Math. Comput..

[32]  Ali H. Nayfeh,et al.  Non-linear responses of suspended cables to primary resonance excitations , 2003 .

[33]  A. M. El-Naggar,et al.  Periodic and non-periodic combination resonance in kinematically excited system of rods , 2003, Appl. Math. Comput..

[34]  A. El-Bassiouny,et al.  Nonlinear stability and chaos in electrohydrodynamics , 2005 .

[35]  Gamal M. Mahmoud,et al.  Chaos control of chaotic limit cycles of real and complex van der Pol oscillators , 2004 .

[36]  A. Nayfeh,et al.  Applied nonlinear dynamics : analytical, computational, and experimental methods , 1995 .

[37]  Alfredo C. Desages,et al.  Bifurcations and Hopf Degeneracies in Nonlinear Feedback Systems with Time Delay , 1996 .

[38]  M. Eissa,et al.  Analytical and numerical solutions of a non-linear ship rolling motion , 2003, Appl. Math. Comput..

[39]  Y. El‐Dib Nonlinear Mathieu equation and coupled resonance mechanism , 2001 .

[40]  Yuan-Jay Wang,et al.  Steady-State Analysis for a Class of Sliding Mode Controlled Systems Using Describing Function Method , 2002 .

[41]  Ali H. Nayfeh,et al.  Nonlinear analysis of the forced response of structural elements , 1974 .

[42]  A. Nayfeh Introduction To Perturbation Techniques , 1981 .

[43]  Shafic S. Oueini,et al.  Single-Mode Control of a Cantilever Beam Under Principal Parametric Excitation , 1999 .

[44]  Ali H. Nayfeh,et al.  Nonlinear Responses of Buckled Beams to Subharmonic-Resonance Excitations , 2004 .

[45]  Zdravko Virag,et al.  Autoparametric resonance in an externally excited system , 1994 .

[46]  J. Thompson,et al.  Nonlinear Dynamics and Chaos: Geometrical Methods for Engineers and Scientists , 1986 .