ric_desc

ric_desc — Riccati equation

Calling sequence

X=ric_desc(H [,E))  
[X1,X2,zero]=ric_desc(H [,E])  

Parameters

H,E : real square matrices
X1,X2 : real square matrices
zero : real number

Description

Riccati solver with hamiltonian matrices as inputs.

In the continuous time case calling sequence is ric_descr(H) (one input):

Riccati equation is:



  (Ec)   A'*X + X*A + X*R*X -Q = 0.
   
    

Defining the hamiltonian matrix H by:



 H = [A  R;
      Q -A']
   
    

with the calling sequence [X1,X2,zero]=ric_descr(H), the solution X is given by X=X1/X2.

zero = L1 norm of rhs of (Ec)

The solution X is also given by X=riccati(A,Q,R,'c'))

In the discrete-time case calling sequence is ric_descr(H,E) (two inputs):

The Riccati equation is:



   (Ed)  A'*X*A-(A'*X*B*(R+B'*X*B)^-1)*(B'*X*A)+C-X = 0.
   
    

Defining G=B/R*B' and the hamiltonian pencil (E,H) by:



      E=[eye(n,n),G;               H=[A, 0*ones(n,n);
         0*ones(n,n),A']             -C, eye(n,n)];
   
    

with the calling sequence [X1,X2,err]=ric_descr(H,E), the solution X is given by X=X1/X2.

zero= L1 norm of rhs of (Ed)

The solution X is also given by X=riccati(A,G,C,'d') with G=B/R*B'

See also

riccati