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solving differential riccati equation with a boundary condition

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Ifunanya
Ifunanya 2014년 8월 18일
댓글: Mingze Yin 2021년 12월 3일
i would like to solve a riccati differential equation using matlab
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Esmail Alandoli
Esmail Alandoli 2016년 11월 3일
see this link. it might be helpful for you https://www.mathworks.com/help/control/ref/care.html

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Aykut Satici
Aykut Satici 2014년 8월 18일
편집: Walter Roberson 2016년 11월 7일
Since the Riccati equation is a first-order ordinary differential equation, you can do this easily with any of the ODE solvers available in MATLAB such as "ode45", see
http://www.mathworks.com/help/matlab/ref/ode45.html
The trick is to find the solution backwards in time.
As an example, let us consider the following example. Let the Riccati equation be given by
y'(t) = q0 + q1*y(t) + q2*y(t)^2,
y(tf) = yf
where q0, q2 are non-vanishing constants (these may be nontrivial functions of t, the fact that they are chosen to be constant is just for simplicity). The second line is the boundary condition that at the end time tf, the value of the solution must be yf. I have chosen, in particular, tf = 2 and yf = 1 in the example code below.
function riccatiEquationRunner()
par = [1;2;1]; % q0, q1, and q2
yf = 1;
ti = 0; tf = 2;
opt = odeset('AbsTol',1.0e-07,'RelTol',1.0e-07);
[t,y] = ode45( @riccatiEquation, [tf,ti], yf ,opt, par);
% Visualize
plot(t,y)
end
function dydx = riccatiEquation(x,y,parameters)
q0 = parameters(1);
q1 = parameters(2);
q2 = parameters(3);
dydx = q0 + q1*y + q2*y*y;
end
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이전 댓글 2개 표시
jalal khodaparast
jalal khodaparast 2019년 10월 23일
I apply ode45 to the complex differential riccati equation (solution is complex value) but I get unstable fluctuations in the results? Do you know how to solve this problem?
Mingze Yin
Mingze Yin 2021년 12월 3일
Thanks so much for this. However, could you help me on how to write a code for solving a Riccati differential equation of the same form as u suggested, only when q1 and q2 are some function of t (instead of being fixed constants)?
so maybe for example:
y'(t) = q0 + q1*y(t) + q2*y(t)^2;
y(tf) = yf;
where q1 = t, q2 = t^2;
Thanks so much!

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추가 답변 (1개)

Esmail Alandoli
Esmail Alandoli 2016년 11월 7일
편집: Walter Roberson 2016년 11월 7일
Hi,
May you guys help me if you can please?
I have problem with the system below for solving the riccati equation for Y infinity. I always get the error of "Unable to solve the specified Riccati equation because the Hamiltonian spectrum is too close to the imaginary axis."
g = 40000;
A = [0 0 1 0; 0 0 0 1; 0 673.07 -35.1667 0; 0 -1023.07 35.1667 0];
B = [0; 0; 61.7325; -61.7325]';
B1 =[0 0 0 0]';
B2 = B;
C1 = [0 0 0 0]';
C2 = [1 1 0 0]';
C = [C1 , C2]
m1 = size(C1,2)
m2 = size(C2,2)
R = [-g^2*eye(m1) zeros(m1,m2) ; zeros(m2,m1) eye(m2)]
Y = care(A,C,B'*B,R)
can you please help?
Thank you so much
Esmail

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