cainv
Dual of abinv
Syntax
[X, dims, J, Y, k, Z] = cainv(Sl, alfa, beta, flag)
Arguments
- Sl
syslin
list containing the matrices[A,B,C,D]
.- alfa
real number or vector (possibly complex, location of closed loop poles)
- beta
real number or vector (possibly complex, location of closed loop poles)
- flag
(optional) character string
'ge'
(default) or'st'
or'pp'
- X
orthogonal matrix of size nx (dim of state space).
- dims
integer row vector
dims=[nd1,nu1,dimS,dimSg,dimN]
(5 entries, nondecreasing order).Ifflag='st'
, (resp.'pp'
),dims
has 4 (resp. 3) components.- J
real matrix (output injection)
- Y
orthogonal matrix of size ny (dim of output space).
- k
integer (normal rank of
Sl
)- Z
non-singular linear system (
syslin
list)
Description
cainv
finds a bases (X,Y)
(of state space and output space resp.)
and output injection matrix J
such that the matrices of Sl in
bases (X,Y) are displayed as:
[A11,*,*,*,*,*] [*] [0,A22,*,*,*,*] [*] X'*(A+J*C)*X = [0,0,A33,*,*,*] X'*(B+J*D) = [*] [0,0,0,A44,*,*] [0] [0,0,0,0,A55,*] [0] [0,0,0,0,0,A66] [0] Y*C*X = [0,0,C13,*,*,*] Y*D = [*] [0,0,0,0,0,C26] [0]
The partition of X
is defined by the vector
dims=[nd1,nu1,dimS,dimSg,dimN]
and the partition of Y
is determined by k
.
Eigenvalues of A11
(nd1 x nd1)
are unstable.
Eigenvalues of A22
(nu1-nd1 x nu1-nd1)
are stable.
The pair (A33, C13)
(dimS-nu1 x dimS-nu1, k x dimS-nu1)
is observable,
and eigenvalues of A33
are set to alfa
.
Matrix A44
(dimSg-dimS x dimSg-dimS)
is unstable.
Matrix A55
(dimN-dimSg,dimN-dimSg)
is stable
The pair (A66,C26)
(nx-dimN x nx-dimN)
is observable,
and eigenvalues of A66
set to beta
.
The dimS
first columns of X
span S= smallest (C,A) invariant
subspace which contains Im(B), dimSg
first columns of X
span Sg the maximal "complementary detectability subspace" of Sl
The dimN
first columns of X
span the maximal
"complementary observability subspace" of Sl
.
(dimS=0
if B(ker(D))=0).
If flag='st'
is given, a five blocks partition of the matrices is
returned and dims
has four components. If flag='pp'
is
given a four blocks partition is returned (see abinv).
This function can be used to calculate an unknown input observer:
// DDEP: dot(x)=A x + Bu + Gd // y= Cx (observation) // z= Hx (z=variable to be estimated, d=disturbance) // Find: dot(w) = Fw + Ey + Ru such that // zhat = Mw + Ny // z-Hx goes to zero at infinity // Solution exists iff Ker H contains Sg(A,C,G) inter KerC (assuming detectability) //i.e. H is such that: // For any W which makes a column compression of [Xp(1:dimSg,:);C] // with Xp=X' and [X,dims,J,Y,k,Z]=cainv(syslin('c',A,G,C)); // [Xp(1:dimSg,:);C]*W = [0 | *] one has // H*W = [0 | *] (with at least as many aero columns as above).
See also
- abinv — AB invariant subspace
- dt_ility — detectability test
- ui_observer — unknown input observer
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