Frequency theorem
A theorem that states conditions for the solvability of the Lur'e equations in control theory:
 | (1) |
where 
, 
, 
, 
, 
are given 
, 
, 
, 
, and 
matrices respectively, and 
, 
are the required 
and 
matrices. The Lur'e equations have two other equivalent forms: If 
,
 | (2) |
where 
, 
, and in the general case
 | (3) |
where 
is a given Hermitian form of two vectors 
, 
;
 |
Moreover, 
, 
, 
, 
.
Let the pair 
be controllable: 
. Then the Lur'e equations reduce to the case where
 |
If 
and all the matrices are real, the Lur'e equations in scalar notation take the form
 |
here 
is the required vector.
The frequency theorem asserts that for the Lur'e equations to be solvable it is necessary and sufficient that
 |
for all 
, 
, 
(
is the identity matrix). The frequency theorem also formulates a procedure for determining the matrices 
and 
and asserts that if
 |
(for all 
, and all 
), then there exist (unique) matrices 
and 
such that (except for the case of equation (3)) the following is true: 
is a Hurwitz matrix (see [3]).
The Lur'e equations in the form (2) are also sometimes called the matrix algebraic Riccati equation. The frequency theorem is used when solving problems on absolute stability [2], [4]–[6], control and adaptation (see, for example, [7]–[9]).
References
| [1] | A.I. Lur'e, "Some non-linear problems of the theory of automatic control" , Moscow-Leningrad (1951) (In Russian) |
| [2] | V.M. Popov, "Hyperstability of control systems" , Springer (1973) (Translated from Rumanian) |
| [3] | V.A. Yakubovich, "A frequency theorem in control theory" Sib. Math. J. , 14 : 2 (1973) pp. 265–289 Sibirsk. Mat. Zh. , 14 : 2 (1973) pp. 384–420 |
| [4] | A.K. Gelig, G.A. Leonov, V.A. Yakubovich, "Stability of non-linear systems with a unique equilibrium state" , Moscow (1978) (In Russian) |
| [5] | , Methods for studing non-linear systems of automatic control , Moscow (1975) (In Russian) |
| [6] | D.D. Siljak, "Nonlinear systems. Parameter analysis and design" , Wiley (1969) |
| [7] | V.N. Fomin, A.L. Fradkov, V.A. Yakubovich, "Adaptive control of dynamic objects" , Moscow (1981) (In Russian) |
| [8a] | J.C. Willems, "Almost invariant subspaces: an approach to high gain feedback design I. Almost controlled invariant subspaces" IEEE Trans. Autom. Control , 1 (1981) pp. 235–252 |
| [8b] | J.C. Willems, "Almost invariant subspaces: an approach to high gain feedback design I. Almost conditionally invariant subspaces" IEEE Trans. Autom. Control , 5 (1982) pp. 1071–1084 |
| [9] | W. Coppel, "Matrix quadratic equations" Bull. Austr. Math. Soc. , 10 (1974) pp. 377–401 |
Comments
The frequency theorem is better known as the Kalman–Yakubovich lemma or Kalman–Yacubovich lemma.
References
| [a1] | R.E. Kalman, "Lyapunov functions for the problem of Lurie in automatic control" Proc. Nat. Acad. Soc. USA , 49 : 2 (1963) pp. 201–205 |
| [a2] | B.D.O. Anderson, S. Vongpanitlerd, "Network analysis and synthesis: a modern systems theory approach" , Prentice-Hall (1973) |
Frequency theorem. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Frequency_theorem&oldid=18832