A non-probabilistic time-variant reliable control method for structural vibration suppression problems with interval uncertainties

Abstract Active control techniques are necessary to structural vibration problems and thus studies of controller design are particularly important in mechanical dynamic engineering. Because parametric deviations due to inherent nature or external excitation are inevitable and can severely influence the final performance of real control systems, optimal active control considering uncertainty is gradually becoming a major concern in modern theory fields. In this paper, a novel non-probabilistic time-variant reliability-based optimization (NTRBO) strategy is presented for closed-loop controller design of vibration reduction issues. First, boundary rules and auto-correlation characteristics of controlled responses are confirmed based on the state-space transformation and the interval process approach. Then, enlightened by models of the first passage and the safety factor (SF), a new definition of the time-variant reliability measurement is provided. As keys to construct the optimal controller, weighing matrices in the Riccati equation are finally determined by solving the developed NTRBO model. The validity and the feasibility of the proposed methodology are demonstrated by several example applications, and the results reveal that uncertainty factors in optimal active control can be addressed from a new time-variant reliability perspective.

[1]  W. Steve Shepard,et al.  Vibration reduction in aerospace structures via an optimized modified positive velocity feedback control , 2015 .

[2]  E. M. Elbeheiry,et al.  OPTIMAL CONTROL OF VEHICLE RANDOM VIBRATION WITH CONSTRAINED SUSPENSION DEFLECTION , 1996 .

[3]  Jia Guo,et al.  Sequential optimization and reliability assessment for multidisciplinary systems design , 2008 .

[4]  Tom J. Moir State-Space Control , 2020 .

[5]  Jiafan Zhang OPTIMAL CONTROL FOR MECHANICAL VIBRATION SYSTEMS BASED ON SECOND-ORDER MATRIX EQUATIONS , 2002 .

[6]  Yang Shi,et al.  Robust finite frequency H∞ static-output-feedback control with application to vibration active control of structural systems , 2014 .

[7]  D. Hrovat,et al.  Survey of Advanced Suspension Developments and Related Optimal Control Applications, , 1997, Autom..

[8]  Jie Liu,et al.  An outcrossing rate model and its efficient calculation for time-dependent system reliability analysis , 2017 .

[9]  Paolo Gardonio,et al.  Review of Active Techniques for Aerospace Vibro-Acoustic Control , 2002 .

[10]  Shuxiang Guo Robust reliability method for non-fragile guaranteed cost control of parametric uncertain systems , 2014, Syst. Control. Lett..

[11]  Su-Seng Pang,et al.  Optimal actuation in vibration control , 2013 .

[12]  Mu Lan Wang,et al.  Study on Dynamic Performance of Linear Direct Drive Based on Pole Placement , 2012 .

[13]  Xiaojun Wang,et al.  Response analysis based on smallest interval-set of parameters for structures with uncertainty , 2012 .

[14]  Yozo Fujino,et al.  Model-based design and experimental validation of active vibration control for a stress ribbon bridge using pneumatic muscle actuators , 2011 .

[15]  Lei Wang,et al.  Non-probabilistic stability reliability measure for active vibration control system with interval parameters , 2017 .

[16]  Arun P. Parameswaran,et al.  Modeling of low frequency dynamics of a smart system and its state feedback based active control , 2018 .

[17]  Xu Wang,et al.  Reduction of low frequency vibration of truck driver and seating system through system parameter identification, sensitivity analysis and active control , 2018 .

[18]  Xiaojun Wang,et al.  Structural time‐dependent reliability assessment of the vibration active control system with unknown‐but‐bounded uncertainties , 2017 .

[19]  Hong-Zhong Huang,et al.  Sequential optimization and reliability assessment for multidisciplinary design optimization under aleatory and epistemic uncertainties , 2009 .

[20]  Xiaojun Wang,et al.  A feasible implementation procedure for interval analysis method from measurement data , 2014 .

[21]  Gene F. Franklin,et al.  Optimal Control Formulations of Vibration Reduction Problems , 2010, IEEE Transactions on Automatic Control.

[22]  A. Alaimo,et al.  A robust active control system for shimmy damping in the presence of free play and uncertainties , 2017 .

[23]  Vincent Roberge,et al.  Comparison of Parallel Genetic Algorithm and Particle Swarm Optimization for Real-Time UAV Path Planning , 2013, IEEE Transactions on Industrial Informatics.

[24]  Kosuke Nagaya,et al.  VIBRATION CONTROL OF A STRUCTURE BY USING A TUNABLE ABSORBER AND AN OPTIMAL VIBRATION ABSORBER UNDER AUTO-TUNING CONTROL , 1999 .

[25]  Huajiang Ouyang,et al.  Active assignment of eigenvalues and eigen-sensitivities for robust stabilization of friction-induced vibration , 2017 .

[26]  Xiaojun Wang,et al.  A novel method of non-probabilistic reliability-based topology optimization corresponding to continuum structures with unknown but bounded uncertainties , 2017 .

[27]  C. Jiang,et al.  A Hybrid Reliability Approach Based on Probability and Interval for Uncertain Structures , 2012 .

[28]  Yunlong Li,et al.  Active force control of structure-borne sound based on robust optimization subjected to an irregular cavity with uncertainties , 2018 .

[29]  Z. Kang,et al.  Non-probabilistic reliability-based topology optimization of geometrically nonlinear structures using convex models , 2009 .

[30]  Anuradha M. Annaswamy,et al.  ${\rm L}_{1}$-Adaptive Control: Stability, Robustness, and Interpretations , 2014, IEEE Transactions on Automatic Control.

[31]  B. Anderson,et al.  Optimal control: linear quadratic methods , 1990 .

[32]  Yunlong Li,et al.  Hybrid time-variant reliability estimation for active control structures under aleatory and epistemic uncertainties , 2018 .

[33]  Lei Wang,et al.  Uncertainty quantification and propagation analysis of structures based on measurement data , 2011, Math. Comput. Model..

[34]  Peter Avitabile,et al.  Equivalent reduced model technique development for nonlinear system dynamic response , 2013 .

[35]  Rafael Palacios,et al.  Optimal vibration control and co-design of very flexible actuated structures , 2016 .

[36]  T. T. Soong,et al.  Passive and Active Structural Vibration Control in Civil Engineering , 1994, CISM International Centre for Mechanical Sciences.

[37]  Isaac Elishakoff,et al.  Three Versions of the Finite Element Method Based on Concepts of Either Stochasticity, Fuzziness, or Anti-Optimization , 1998 .

[38]  Hui Yin,et al.  Nondeterministic wave-based methods for low- and mid-frequency response analysis of acoustic field with limited information , 2017 .

[39]  Yakov Ben-Haim,et al.  Discussion on: A non-probabilistic concept of reliability , 1995 .

[40]  James Lam,et al.  Non-fragile H∞ vibration control for uncertain structural systems , 2004 .

[41]  Zhiping Qiu,et al.  The need for introduction of non-probabilistic interval conceptions into structural analysis and design , 2016 .

[42]  Stephen P. Timoshenko,et al.  Vibration problems in engineering , 1928 .

[43]  B J Fregly,et al.  Parallel global optimization with the particle swarm algorithm , 2004, International journal for numerical methods in engineering.

[44]  Wei Gao,et al.  Reliability-Based Optimization of Active Nonstationary Random Vibration Control , 2005 .

[45]  Robert F. Stengel,et al.  Optimal Control and Estimation , 1994 .

[46]  Tamara Nestorović,et al.  Optimal actuator and sensor placement based on balanced reduced models , 2013 .

[47]  Karl Johan Åström,et al.  Adaptive Control , 1989, Embedded Digital Control with Microcontrollers.

[48]  Debabrata Chakraborty,et al.  Optimal vibration control of smart fiber reinforced composite shell structures using improved genetic algorithm , 2009 .

[49]  Chris F. Beards,et al.  Engineering Vibration Analysis with Application to Control Systems , 1995 .

[50]  Harry L. Trentelman,et al.  Stabilization, pole placement, and regular implementability , 2002, IEEE Trans. Autom. Control..

[51]  Lihua Wang,et al.  A novel optimal configuration of sensor and actuator using a non-linear integer programming genetic algorithm for active vibration control , 2017 .

[52]  Hao Wu,et al.  A novel non-probabilistic reliability-based design optimization algorithm using enhanced chaos control method , 2017 .

[53]  M. F. Golnaraghi,et al.  Active Structural Vibration Control: A Review , 2003 .

[54]  James L. Beck,et al.  Reliability‐based control optimization for active base isolation systems , 2006 .