Available in electronic format
Available in print format		 Bulletin of the American Mathematical Society
Bulletin of the American Mathematical Society
ISSN 1088-9485(e) ISSN 0273-0979(p)
Previous issue | Table of contents | Next issue
Articles in press | Recently posted articles | Most recent issue | All issues: 1891 - Present
Previous Article | Next Article
     

Book Review

The AMS does not provide abstracts of book reviews. You may download the entire review from the links below.

Retrieve article in: PDF

Book Information

Author(s): Ciprian Foias and Arthur E. Frazho
Title: The commutant lifting approach to interpolation problems
Additional book information: Birkh\"auser, Basel, 1990, 6331 pp., US$129{.}00. ISBN 3-7643-2461-9

References:

[Ad]
V. M. Adamyan, Nondegenerate unitary couplings of semiunitary operators, Functional Anal. Appl. \textbf{7} (1973), 255--267.
[AAK1]
V. M. Adamjan, D. Z. Arov, and M. G. Krein, Infinite Hankel matrices and generalized Carath\'eodory-Fej\'er and I. Schur problems, Funktsional. Anal. i Prilozhen \textbf{2} (1968), 1--17.
[AAK2]
V. M. Adamjan, D. Z. Arov, and M. G. Krein, Analytic properties of Schmidt pairs for a Hankel operator and the generalized problem of Schur-Takagi, USSR-Sb. \textbf{15} (1971), 31--73.
[AAK3]
V. M. Adamjan, D. Z. Arov, and M. G. Krein, Infinite block Hankel matrices and problems of continuation related to them, Amer. Math. Soc. Transl. Ser. 2 \textbf{111} (1978), 133--156.
[Ak]
N. I. Akhiezer, The classical moment problem, Oliver and Boyd, Edinburgh, 1965.
[AB]
D. Alpay and V. Bolotnikov, Two sided Nevanlinna-Pick interpolation for a class of matrix valued functions, Z. Anal. Anwendungen \textbf{12} (1993), 221--238.
[ABDS1]
D. Alpay, P. Bruinsma, A. Dijksma, and H. de Snoo, \emph{Interpolation problems, extensions of symmetric operators and reproducing kernel spaces \rm I}, Topics in Matrix and Operator Theory (H. Bart, I. Gohberg, and M. Kaashoek, eds.), Birkh\"auser, Basel, 1991 pp.~35--82.
[ABDS2]
D. Alpay, P. Bruinsma, A. Dijksma, and H. de Snoo, Interpolation problems, extensions of symmetric operators and reproducing kernel spaces. \rm II, Integral Equations Operator Theory \textbf{14} (1991), 465--500.
[AD1]
D. Alpay and H. Dym, \emph{On reproducing kernels spaces, the Schur algorithm and interpolation in a general class of domains}, Operator Theory and Complex Analysis (T. Ando and I. Gohberg, eds.), Birkh\"auser-Verlag, Basel, 1992 pp.~30--77.
[AD2]
D. Alpay and H. Dym, On a new class of structured reproducing kernel spaces, J. Funct. Anal. \textbf{111} (1993), 1--28.
[Arov1]
D. Z. Arov, Gamma-generating matrices, $J$-inner matrix functions and related extrapolation problems, J. Soviet Math. \textbf{52} (1990), 3487--3491.
[Arov2]
D. Z. Arov, \emph{Regular $J$-inner matrix-functions and related continuation problems}, Birkh\"auser, Basel, 1990.
[AG]
D. Z. Arov and L. Z. Grossman, Scattering matrices in the theory of unitary extensions of isometric operators, Math. Nachr. \textbf{157} (1992), 105--123.
[AK]
D. Z. Arov and M. G. Krein, Calculation of entropy functionals and their minima in indeterminate continuation problems, Acta Sci. Math. (Szeged) \textbf{45} (1983), 33--50.
[Aroc1]
R. Arocena, Generalized Toeplitz kernels and dilations of intertwining operators, Integral Equations Operator Theory \textbf{6} (1983), 759--788.
[Aroc2]
R. Arocena, Generalized Toeplitz kernels and dilations of intertwining operators, {\rm II}. The continuous case, Acta Sci. Math. (Szeged) \textbf{53} (1989), 123--137.
[BaC]
M. Bakonyi and T. Constantinescu, \emph{Schur's algorithm and several applications}, Longman, Essex, 1992.
[Ba1]
J. A. Ball, Models for noncontractions, J. Math. Anal. Appl. \textbf{52} (1975), 235--254.
[Ba2]
J. A. Ball, \emph{Nevanlinna-Pick interpolation\RM : Generalizations and applications}, Pitman, Boston, 1988 pp.~51--94.
[BaC]
J. A. Ball and N. Cohen, Sensitivity minimization in an $H_\infty $ norm\RM : parametrization of all suboptimal solutions, Internat. J. Control \textbf{46} (1987), 785--816.
[BGR]
J. A. Ball, I. Gohberg, and L. Rodman, Interpolation of rational matrix functions, Birkh\"auser-Verlag, Basel, 1990.
[BH]
J. A. Ball and J. W. Helton, Interpolation problems of Pick-Nevanlinna and Loewner types for meromorphic functions\,\RM : parametrization of the set of all solutions, Integral Equations Operator Theory \textbf{9} (1986), 155--203.
[BR]
J. A. Ball and A. C. Ran, Optimal Hankel norm model reductions and Wiener Hopf factorization {\rm II:} The non-canonical case, Integral Equations Operator Theory \textbf{10} (1987), 416--436.
[dB]
L. deBranges, Some Hilbert spaces of analytic functions {\rm I}, Trans. Amer. Math. Soc. \textbf{106} (1963), 445--468.
[Br]
P. Bruinsma, Degenerate interpolation problems for Nevanlinna pairs, Indag. Math. \textbf{2} (1991), 179--200.
[BD]
A. Bultheel and P. Dewilde, On the Adamjan-Arov-Krein approximation, identification and balanced realization of a system, Technical Report \textbf{TW48\rm , Katholieke Universiteit Leuven, 1980; a short version appears in Proceedings ECTI (1980), 186--191}.
[CP]
B. C. Chang and J. B. Pearson, Optimal disturbance reduction in linear multivariable systems, IEEE Trans. Automat. Control \textbf{AC-29} (1984), 880--887.
[CS]
M. Cotlar and C. Sadosky, \emph{Toeplitz liftings of Hankel forms}, Lecture Notes in Math., vol. 1302, Springer, Berlin, 1988 pp.~22--43.
[CZ]
R. F. Curtain and H. J. Zwart, The Nehari problem or the Pritchard-Salmon class of infinite-dimensional linear system\RM : A direct approach, preprint, 1993.
[DGK]
Ph. Delsarte, Y. Genin, and Y. Kamp, On the role of the Nevanlinna-Pick problem in circuit and system theory, Internat. J. Circuit Theory Appl. \textbf{9} (1981), 177--187.
[DD]
P. Dewilde and H. Dym, Lossless chain scattering matrices and optimum linear prediction\RM : The vector case, Internat. J. Circuit Theory Appl. \textbf{9} (1981), 135--175.
[DGKF]
J. C. Doyle, K. Glover, P. P. Khargonekar, and B. A. Francis, State space solutions to standard $\scr H_2$ and $\scr H_\infty $ control problems, IEEE Trans. Autom. Control \textbf{AC-34} (1989), 831--846.
[D1]
H. Dym, \emph{J contractive matrix functions, reproducing kernel Hilbert spaces and interpolation}, Amer. Math. Soc., Providence, RI, 1989.
[D2]
H. Dym, \emph{On reproducing kernel spaces, J unitary matrix functions, interpolation and displacement rank}, The Gohberg Anniversary Collection II (H. Dym, S. Goldberg, M. A. Kaashoek, and P. Lancaster, eds.), Birkh\"auser-Verlag, Basel, 1989 pp.~173--239.
[D3]
H. Dym, On reproducing kernels and the continuous covariance extension problem, Analysis and Partial Differential Equations: A collection of Papers dedicated to Mischa Cotlar (C. Sadosky, ed.), Marcel Dekker, New York, 1990, pp.~427--482.
[D4]
H. Dym, Shifts, realizations and interpolation, redux, Operator Theory and its Applications (A. Feintuch and I. Gohberg, eds.), Oper. Theory Adv. Appl., Birkh\"auser-Verlag, Basel, 1994.
[D5]
H. Dym, On the zeros of some continuous analogues of matrix orthogonal polynomials and a related extension problem with negative squares, Comm. Pure Appl. Math. \textbf{47} (1994), 1--53.
[DFK]
V. K. Dubovoj, B. Fritzsche, and B. Kirstein, Marticial version of the classical Schur problem, Teubner, Leipzig, 1992.
[EGL]
R. L. Ellis, I. Gohberg, and D. C. Lay, Extensions with positive real part, a new version of the abstract band method with applications, Integral Equations Operator Theory \textbf{16} (1993), 360--384.
[FFHKP]
C. Foias, B. Francis, J. W. Helton, H. Kwakernaak, and J. B. Pearson, \emph{$H_\infty $-control theory \rm (E. Mosca and L. Pandolfi, eds.)}, Springer-Verlag, Berlin, 1991.
[FF]
C. Foias and A. Frazho, The commutant lifting approach to interpolation problems, Birkh\"auser-Verlag, Basel, 1990.
[FT]
C. Foias and A. Tannenbaum, On the four block problem {\rm II:} The singular system, Integral Equations Operator Theory \textbf{11} (1988), 726--767.
[Fr]
B. A. Francis, \emph{A course in $H_\infty $ control theory}, Springer-Verlag, Berlin, 1987.
[FrD]
B. A. Francis and J. C. Doyle, Linear control theory with an $H_\infty $ optimality criterion, SIAM J. Control Optim. \textbf{25} (1987), 815--844.
[FrZ]
B. A. Francis and G. Zames, On $H^\infty $-optimal sensitivity theory for SISO feedback systems, IEEE Trans. Automat. Control \textbf{AC-29} (1984), 9--16.
[GK]
Y. V. Genin and S. Y. Kung, A two-variable approach to the model reduction problem with Hankel norm criterion, IEEE Trans. Circuits and Systems \textbf{CAS-28} (1981), 912--924.
[GeK]
T. T. Georgiou and P. P. Khargonekar, Spectral factorization and Nevanlinna-Pick interpolation, SIAM J. Control Optim. \textbf{25} (1987), 754--766.
[GeS]
T. T. Georgiou and M. C. Smith, \emph{Topological approaches to robustness}, Springer-Verlag, New York, 1993 pp.~222--241.
[Glo]
K. Glover, A tutorial on Hankel norm approximation, From Data to Model (J. C. Willems, ed.), Springer, Berlin, 1989, pp.~26--48.
[GloD]
K. Glover and J. C. Doyle, \emph{A state space approach to $H_\infty $ optimal control}, Springer-Verlag, Berlin, 1989 pp.~179--218.
[GLDKS]
K. Glover, D. J. N. Limebeer, J. C. Doyle, E. M. Kasenally, and M. G. Safonov, A characterization of all solutions to the four block general distance problem, SIAM J. Control Optim. \textbf{29} (1991), 283--324.
[Gr]
M. Green, $H_\infty $ controller synthesis by $J$-lossless coprime factorization, SIAM J. Control Optim. \textbf{30} (1992), 522--547.
[GGLD]
M. Green, K. Glover, D. J. N. Limebeer, and J. C. Doyle, A $J$-spectral factorization approach to $H_\infty $ control, SIAM J. Control Optim. \textbf{28} (1990), 1350--1371.
[GrL]
M. Green and D. J. N. Limebeer, Vector interpolation, $H_\infty $ control and model reduction, Robust of Linear Systems and Nonlinear Control, Birkh\"auser, Boston, 1990, pp.~285--292.
[He1]
J. W. Helton, Orbit structure of the M\"obus transformation semigroup acting on $H^\infty $ \RM (broadband matching\RM ), Topics in Functional Analysis, Academic Press, New York, 1978, pp.~129--157.
[He2]
J. W. Helton, \emph{Operator theory, analytic functions, matrices and electrical engineering}, Amer. Math. Soc., Providence, RI, 1987.
[HSP]
G. Herglotz, I. Schur, G. Pick, R. Nevanlinna, and H. Weyl, Ausgew\"ahlte Arbeiten zu den Urspr\"ungen der Schur-Analysis, Teubner, Leipzig, 1991.
[K1]
V. E. Katsnelson, Methods of $J$-theory in continuous interpolation problems of analysis, private translation, T. Ando, Sapporo, 1985.
[K2]
V. E. Katsnelson, \emph{The problem of the completion of a partial matrix valued function as a classical interpolation problem} (V. A. Marchenko, ed.), vol. 56, Vishcha Shkola, Kharkov, 1991 pp.~105--122.
[KKY]
V. E. Katsnelson, A. Ya. Kheifets, and P. M. Yuditskii, An abstract interpolation problem and the theory of extensions of isometric operators, Operators in Function Spaces and Problems in Function Theory, vol. 146, ``Naukova Dumka'', Kiev, 1987, pp.~83--96.
[Ki1]
H. Kimura, Directional interpolation approach to $H^\infty $ optimization and robust stabilization, IEEE Trans. Automat. Control \textbf{AC-32} (1987), 1085--1093.
[Ki2]
H. Kimura, Conjugation interpolation and model matching in $H^\infty $, Internat. J. Control \textbf{49} (1989), 269--307.
[Ki3]
H. Kimura, \emph{State space approach to the classical interpolation problem and its applications}, Lecture Notes in Control and Inform. Sci., vol. 135, Springer-Verlag, Berlin, 1989 pp.~243--275.
[KL]
S. Y. King and D. W. Lin, Optimal Hankel-norm model reductions\,\RM : multivariable systems, IEEE Trans. Automat. Control \textbf{AC-26} (1981), 832--852.
[KPot]
I.V. Kovalishina, Analytic theory of a class of interpolation problems, Math. USSR-Izv. \textbf{22} (1984), 419--463.
[KL1]
M. G. Krein and H. Langer, On some extension problems which are closely connected with the theory of hermitian operators in a space $\Pi _\kappa $, $\roman {III}$. Indefinite analogues of the Hamburger and Stieltjes moment problems, Beitr\"age zur Analysis \textbf{14} (1979), 25--40.
[KL2]
M. G. Krein and H. Langer, On some continuation problems which are closely related to the theory of operators in spaces $\Pi _\kappa $. {\rm IV:} Continuous analogues of orthogonal polynomials on the unit circle with respect to an indefinite weight and related continuation problems for some classes of functions, J. Operator Theory \textbf{13} (1985), 299--417.
[KN]
M. G. Krein and A. A. Nudelman, \emph{The Markov moment problem and extremal problems}, Amer. Math. Soc., Providence, RI, 1977.
[LA]
D. J. N. Limebeer and B. D. O. Anderson, An interpolation theory approach to $H^\infty $ controller degree bounds, Linear Algebra Appl. \textbf{89} (1988), 347--386.
[LGr]
D. J. N. Limebeer and M. Green, Parametric interpolation, $H^\infty $-control and model reduction, Internat. J. Control \textbf{52} (1990), 293--318.
[LK]
D. J. N. Limebeer and E. M. Kasenelly, Necessary and sufficient conditions for the existence of $H^\infty $-optimal controllers\,\RM ; an interpolation approach, Robust Control of Linear Systems and Nonlinear Control, Birkh\"auser, Boston, 1990, pp.~309--316.
[Nu]
A. A. Nudelman, On a new problem of moment type, Soviet Math. Doklady \textbf{18} (1977), 507--510.
[Pa]
L. B. Page, Bounded and compact vectorial Hankel operators, Trans. Amer. Math. Soc. \textbf{150} (1970), 529--534.
[RR]
M. Rosenblum and J. Rovnyak, Hardy classes and operator theory, Oxford Univ. Press, London, 1986.
[Sa]
D. Sarason, Generalized interpolation in $H^\infty $, Trans. Amer. Math. Soc. \textbf{127} (1967), 180--203.
[SNF1]
B. Sz.-Nagy and C. Foias, Commutants de certains operateurs, Acta Sci. Math. (Szeged) \textbf{29} (1968), 1--17.
[SNF2]
B. Sz.-Nagy and C. Foias, Dilation des commutants d'op\'erateurs, C. R. Acad. Sci. Paris S\'er. I Math. \textbf{266} (1968), 493--495.
[SNF3]
B. Sz.-Nagy and C. Foias, Harmonic analysis of operators on Hilbert space, North-Holland, Amsterdam, 1970.
[Ta]
A. Tannenbaum, Modified Nevanlinna-Pick interpolation of linear plants with uncertainty in the gain factor, Internat. J. Control \textbf{36} (1982), 331--336.
[Tad1]
G. Tadmor, An interpolation problem associated with $\scr H_\infty $-optimal design in systems with distributed input lags, Systems Control Lett. \textbf{8} (1987), 313--319.
[Tad2]
G. Tadmor, The standard $H_\infty $ problem and the maximum principle\,\RM : The general linear case, SIAM J. Control Optim. \textbf{31} (1993), 813--846.
[YS]
D. C. Youla and M. Saito, Interpolation with positive real functions, J. Franklin Inst. \textbf{284} (1967), 77--108.
[Y]
N. Young, The Nevanlinna-Pick problem for matrix valued functions, J. Operator Theory \textbf{15} (1986), 239--265.
[Z]
G. Zames, Feedback and optimal sensitivity\,\RM : model reference transformations, multiplicative seminorms, and approximate inverses, IEEE Trans. Automat. Control \textbf{AC-26} (1981), 301--320.

Additional Information:

Reviewer(s):
Harry Dym

Review Information:
Journal: Bull. Amer. Math. Soc. 31 (1994), 125-140.
DOI: 10.1090/S0273-0979-1994-00499-9
PII: S 0273-0979(1994)00499-9

  AMS Website Logo Small Comments: webmaster@ams.org
© Copyright 2009, American Mathematical Society
Privacy Statement 		Search the AMSPowered by Google