Zero assignment in a time delayed continuous system for active vibration control

Active control of undesirable vibrations in structures, such as automobiles, rotors, air/space crafts, buildings, bridges etc., can be realized by pole and/or zero assignment. The Pole assignment problems in active control deals with reassigning a small set of unwanted eigenvalues and/or eigenvectors by using feedback control force to suitably chosen desired location, whereas the suppression of the amplitude of vibration at the desired location in the structure is known as zero assignment. Real time implementation of an active control strategy requires incorporation of the inherent time delay in the feedback loop for control gain computations. In this paper, methods for obtaining closed form solution of control gains for active zero assignment in a non-uniform distributed parameter system is presented while considering a small time delay in a feedback loop. The absorption strategy is demonstrated with examples. Effect of the time delay in control gains is studied and issues related to system stability are briefly discussed.

[1]  Biswa Nath Datta,et al.  Closed Form Control Gains for Zero Assignment in the Time Delayed System , 2011 .

[2]  G. Golub,et al.  A survey of matrix inverse eigenvalue problems , 1986 .

[3]  H. Hu,et al.  Dynamics of Controlled Mechanical Systems with Delayed Feedback , 2002 .

[4]  Yitshak M. Ram,et al.  Zero Assignment in Continuous Systems , 2003 .

[5]  Yitshak M. Ram Nodal Control of a Vibrating Rod , 2002 .

[6]  D. D. Perlmutter,et al.  Stability of time‐delay systems , 1972 .

[7]  Kumar Vikram Singh,et al.  Active/Passive Vibration Control of Continuous Systems by Zero Assignment , 2009 .

[8]  Yitshak M. Ram,et al.  Dynamic Absorption by Passive and Active Control , 2000 .

[9]  John E. Mottershead,et al.  ON THE ZEROS OF STRUCTURAL FREQUENCY RESPONSE FUNCTIONS AND THEIR SENSITIVITIES , 1998 .

[10]  J. Mottershead Structural Modification for the Assignment of Zeros Using Measured Receptances , 2001 .

[11]  G. Stépán Retarded dynamical systems : stability and characteristic functions , 1989 .

[12]  John E. Mottershead,et al.  Inverse eigenvalue problems in vibration absorption: Passive modification and active control , 2006 .

[13]  John E. Mottershead,et al.  Vibration nodes, and the cancellation of poles and zeros by unit-rank modifications to structures , 1999 .

[14]  Yitshak M. Ram,et al.  Transcendental Eigenvalue Problem and Its Applications , 2002 .

[15]  Yitshak M. Ram,et al.  Active Absorption of Viscously Damped System With Time Delay , 2008 .

[16]  D. Inman Vibration control , 2018, Advanced Applications in Acoustics, Noise and Vibration.

[17]  Daniel J. Inman,et al.  Vibration with Control: Inman/Vibration with Control , 2006 .

[18]  John E. Mottershead,et al.  POLE–ZERO CANCELLATION IN STRUCTURES: REPEATED ROOTS , 2000 .

[19]  John E. Mottershead,et al.  State feedback control with time delay , 2009 .

[20]  A N Singh,et al.  Dynamic absorption in a vibrating beam , 2003 .

[21]  J. Paine,et al.  A Numerical Method for the Inverse Sturm–Liouville Problem , 1984 .

[22]  A. P,et al.  Mechanical Vibrations , 1948, Nature.