IDENTIFICATION OF RATIONAL TRANSFER-FUNCTION FROM FREQUENCY-RESPONSE SAMPLES

被引:14
|
作者
KUMARESAN, R
机构
[1] Dep't. of Electrical Engineering, Kelley Hall, University of Rhode Island, Kingston
来源
IEEE TRANSACTIONS ON AEROSPACE AND ELECTRONIC SYSTEMS | 1990年 / 26卷 / 06期
关键词
D O I
10.1109/7.62245
中图分类号
V [航空、航天];
学科分类号
08 ; 0825 ;
摘要
A method for identifying a transfer function, H(z) = A(z)/B(z), from its frequency response values is presented. The method has its roots in the nineteenth century work of Cauchy and Jacobi. Identifying the transfer function involves determining the unknown degrees and coefficients of the polynomials A(z) and B(z), given the frequency response samples. Although the problem is seemingly nonlinear, the method for finding the parameters of the transfer function, involves solving linear simultaneous equations only. An important aspect of the method is the decoupled manner in which the polynomials A(z) and B(z) are determined. We present two slightly different derivations of the linear equations involved, one based on the properties of divided-differences and the other using Vandermonde matrices or equivalently, Lagrange interpolation. A certain matrix synthesized from the given frequency response samples is shown to have a rank equal to the number of poles in the system. These results are strikingly similar to the Prony's method which is used to identify a linear system from its impulse response samples. The method has many applications in filter design, system identification, and signal modeling. © 1990 IEEE
引用
收藏
页码:925 / 934
页数:10
相关论文
共 50 条
  • [21] TRANSFER-FUNCTION IDENTIFICATION THROUGH AN EXAMINATION OF UNIT STEP RESPONSE
    PIQUEREAU, JY
    TRIGESSOU, JC
    AUTOMATISME, 1976, 21 (8-9): : 263 - 267
  • [22] RATIONAL APPROXIMATION OF THE TRANSFER-FUNCTION OF A VISCOELASTIC ROD
    HANNSGEN, KB
    STAFFANS, OJ
    WHEELER, RL
    LECTURE NOTES IN CONTROL AND INFORMATION SCIENCES, 1993, 185 : 551 - 562
  • [23] BINAURAL FREQUENCY-RESPONSE FUNCTION
    AHUMADA, A
    JOURNAL OF THE ACOUSTICAL SOCIETY OF AMERICA, 1976, 60 : S102 - S102
  • [24] FREQUENCY-RESPONSE COMPUTATION VIA RATIONAL INTERPOLATION
    KENNEY, C
    LAUB, AJ
    STUBBERUD, S
    IEEE TRANSACTIONS ON AUTOMATIC CONTROL, 1993, 38 (08) : 1203 - 1213
  • [25] FREQUENCY-RESPONSE FUNCTIONS FOR NONLINEAR RATIONAL MODELS
    ZHANG, H
    BILLINGS, SA
    ZHU, QM
    INTERNATIONAL JOURNAL OF CONTROL, 1995, 61 (05) : 1073 - 1097
  • [26] IDENTIFICATION OF TURBOGENERATOR MODELS FROM FREQUENCY-RESPONSE TESTS
    ARCIDIACONO, V
    DENEGRI, GB
    MACCIO, G
    ELECTRIC MACHINES AND ELECTROMECHANICS, 1981, 6 (03): : 253 - 262
  • [27] DETERMINATION OF A TRANSFER-FUNCTION FROM PHASE RESPONSE DATA
    JONG, MT
    PROCEEDINGS OF THE IEEE, 1979, 67 (04) : 683 - 684
  • [28] ON THE FREQUENCY-RESPONSE OF WALL TRANSFER PROBES
    BRAUNER, N
    INTERNATIONAL JOURNAL OF HEAT AND MASS TRANSFER, 1991, 34 (10) : 2641 - 2652
  • [29] COMPUTATION OF MINIMAL REPRESENTATIONS OF A RATIONAL TRANSFER-FUNCTION MATRIX
    ROSENBROCK, HH
    PROCEEDINGS OF THE INSTITUTION OF ELECTRICAL ENGINEERS-LONDON, 1968, 115 (02): : 325 - +
  • [30] ESTIMATION OF FREQUENCY-RESPONSE FUNCTION OF A MECHANORECEPTOR
    FRENCH, AS
    STEIN, RB
    HOLDEN, AV
    KYBERNETIK, 1972, 11 (01): : 15 - &
12345