Krylov vector methods for model reduction and control of flexible structures

Krylov vectors and the concept of parameter matching are combined here to develop model-reduction algorithms for structural dynamics systems. The method is derived for a structural dynamics system described by a second-order matrix differential equation. The reduced models are shown to have a promising application in the control of flexible structures. It can eliminate control and observation spillovers while requiring only the dynamic spillover terms to be considered. A model-order reduction example and a flexible structure control example are provided to show the efficacy of the method.

[1]  Roy R. Craig,et al.  State-variable models of structures having rigid-body modes , 1990 .

[2]  C. F. Chen Model reduction of multivariable control systems by means of matrix continued fractions , 1974 .

[3]  B. Parlett,et al.  The Lanczos algorithm with selective orthogonalization , 1979 .

[4]  Roy R. Craig,et al.  Controller reduction by preserving impulse response energy , 1989 .

[5]  Ray W. Clough,et al.  Dynamic analysis of structures using lanczos co‐ordinates , 1984 .

[6]  R. Craig,et al.  Model reduction and control of flexible structures using Krylov vectors , 1991 .

[7]  Jer-Nan Juang,et al.  An eigensystem realization algorithm for modal parameter identification and model reduction. [control systems design for large space structures] , 1985 .

[8]  B. Nour-Omid,et al.  Lanczos method for dynamic analysis of damped structural systems , 1989 .

[9]  Roy R. Craig,et al.  Block-Krylov component synthesis method for structural model reduction , 1988 .

[10]  M. Balas,et al.  Feedback control of flexible systems , 1978 .

[11]  R. L. Citerley,et al.  Application of Ritz vectors for dynamic analysis of large structures , 1985 .

[12]  Jih-Sheng Lai,et al.  Practical Model Reduction Methods , 1987, IEEE Transactions on Industrial Electronics.

[13]  J. Hickin,et al.  Model reduction for linear multivariable systems , 1980 .

[14]  Christopher C. Paige,et al.  Practical use of the symmetric Lanczos process with re-orthogonalization , 1970 .

[15]  Roy R. Craig,et al.  Structural dynamics analysis using an unsymmetric block Lanczos algorithm , 1988 .

[16]  L. Shieh,et al.  A mixed method for multivariable system reduction , 1975 .

[17]  Yeung Yam,et al.  Flexible system model reduction and control system design based upon actuator and sensor influence functions , 1987 .

[18]  E. Wilson,et al.  Dynamic analysis by direct superposition of Ritz vectors , 1982 .