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hinf
H_infinity design of continuous-time systems
Calling Sequence
[AK,BK,CK,DK,(RCOND)] = hinf(A,B,C,D,ncon,nmeas,gamma)
Arguments
- A
the n-by-n system state matrix A.
- B
the n-by-m system input matrix B.
- C
the p-by-n system output matrix C.
- D
the p-by-m system matrix D.
- ncon
the number of control inputs. m >= ncon >= 0, p-nmeas >= ncon.
- nmeas
the number of measurements. p >= nmeas >= 0, m-ncon >= nmeas.
- gamma
the parameter gamma used in
H_infinity
design. It is assumed that gamma is sufficiently large so that the controller is admissible. gamma >= 0.- AK
the n-by-n controller state matrix AK.
- BK
the n-by-nmeas controller input matrix BK.
- CK
the ncon-by-n controller output matrix CK.
- DK
the ncon-by-nmeas controller matrix DK.
- RCOND
a vector containing estimates of the reciprocal condition numbers of the matrices which are to be inverted and estimates of the reciprocal condition numbers of the Riccati equations which have to be solved during the computation of the controller. (See the description of the algorithm in [1].)
- RCOND
(1) contains the reciprocal condition number of the control transformation matrix TU,
- RCOND
(2) contains the reciprocal condition number of the measurement transformation matrix TY,
- RCOND
(3) contains an estimate of the reciprocal condition number of the X-Riccati equation,
- RCOND
(4) contains an estimate of the reciprocal condition number of the Y-Riccati equation.
Description
[AK,BK,CK,DK,(RCOND)] = hinf(A,B,C,D,ncon,nmeas,gamma)
To compute the matrices of an H-infinity (sub)optimal n-state
controller
| AK | BK | K = |----|----|, | CK | DK |
for the continuous-time system
| A | B1 B2 | | A | B | P = |----|---------| = |---|---|, | C1 | D11 D12 | | C | D | | C2 | D21 D22 |
and for a given value of gamma, where B2 has column size of the number of control inputs (ncon) and C2 has row size of the number of measurements (nmeas) being provided to the controller.
References
[1] P.Hr. Petkov, D.W. Gu and M.M. Konstantinov. Fortran 77 routines for Hinf and H2 design of continuous-time linear control systems. Report98-14, Department of Engineering, Leicester University, August 1998.
Examples
//example from Niconet report SLWN1999-12 //Hinf A=[-1 0 4 5 -3 -2 -2 4 -7 -2 0 3 -6 9 -5 0 2 -1 -8 4 7 -1 -3 0 2 5 8 -9 1 -4 3 -5 8 0 2 -6]; B=[-3 -4 -2 1 0 2 0 1 -5 2 -5 -7 0 7 -2 4 -6 1 1 -2 -3 9 -8 0 5 1 -2 3 -6 -2]; C=[ 1 -1 2 -4 0 -3 -3 0 5 -1 1 1 -7 5 0 -8 2 -2 9 -3 4 0 3 7 0 1 -2 1 -6 -2]; D=[ 1 -2 -3 0 0 0 4 0 1 0 5 -3 -4 0 1 0 1 0 1 -3 0 0 1 7 1]; Gamma=10.18425636157899; [AK,BK,CK,DK] = hinf(A,B,C,D,2,2,Gamma)
See Also
- dhinf — H_infinity design of discrete-time systems
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