How to solve differential equation including derivative of eigenvalue of tensor?

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Hiroki ENDO
Hiroki ENDO am 24 Sep. 2022
Kommentiert: Bruno Luong am 28 Okt. 2022
I am trying to solve this equation by ODE45.
here, A is sencond-order tensor, and is time derivative of eigenvalue of A.
So, I try to wirte like bellow.
tspan=[0:0.01:1];
Azero= [0.4 0.1 0; 0.1 0.4 0.1; 0 0.1 0.2]
[T,Av] = ode45('Adotxx', tspan, tens2vec(Azero)); % Azero converted to vector style, this is another function
%%
function Aderiv = Adotxx(t, Av)
A = vec2tens(Av); % Azero converted to tensor style from vector style
% making eigenvector
[e, lambda] = eig(A);
% must be sorted eigenvectors and eigenvalues
[lambda_index, SortO] = sort(diag(lambda),'descend');
lambda_temp = zeros(3);
e_temp = zeros(3);
for i =1:3
lambda_temp(i,i) = lambda_index(i);
e_temp(1:3,i) = e(1:3,SortO(i));
end
% time derivative of lambda
lambda_dot = diff(lambda);
X = lambda_dot
% differential equation
Aderiv = A + X
end
However, you know, the lambda_dot is not true time derivative. it is just derivative in matrix at one moment like Differentiation - MATLAB & Simulink - MathWorks. lambda_dot become matrix of (2,3) by diff(lambda).
How can I correct the code?
Thank you for your hospitality.

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Akzeptierte Antwort

Torsten
Torsten am 28 Sep. 2022
Bearbeitet: Torsten am 28 Sep. 2022
Ran in:
A third variante of the code also seems to work under MATLAB ( for high values of the integration tolerances :-) )
syms s
A = sym('A',[3 3]);
% Define characteristic polynomial
determinant = det(A-s*eye(3));
% Compute eigenvalues
lambda = solve(determinant==0,s,'MaxDegree',3);
tspan = [0:0.01:1];
Azero = [0.4 0.1 0; 0.1 0.4 0.1; 0 0.1 0.2];
L = double(subs(lambda,A,Azero)).';
Azero = [Azero;L];
Azero = reshape(Azero.',[12,1]);
M = [eye(9),zeros(9,3);zeros(3,12)];
alpha = 0.2;
M(1,10) = -alpha;
M(5,11) = -alpha;
M(9,12) = -alpha;
options = odeset('Mass',M,'RelTol',1e-3,'AbsTol',1e-3);
[T,Av] = ode15s(@(t,A)Adotxx(t,A,lambda), tspan, Azero, options); % Azero converted to vector style, this is another function
plot(T,Av(:,1))
Warning: Imaginary parts of complex X and/or Y arguments ignored.
function Aderiv = Adotxx(t, A, lambda)
A = reshape(A,[3 4]).';
Av = A(1:3,:);
L = A(4,:);
A = sym('A',[3 3]);
LL = double(subs(lambda,A,Av)).';
% differential equation
Aderiv(1:3,1:3) = Av;
Aderiv(4,1:3) = L - LL;
Aderiv = reshape(Aderiv.',[12 1]);
end
  1 Kommentar
Hiroki ENDO
Hiroki ENDO am 28 Okt. 2022
Thank you for your all advices and hospitality.
I am sorry to late to reply.
This code was worked very well.
Thanks again.

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Weitere Antworten (3)

Walter Roberson
Walter Roberson am 24 Sep. 2022
You need to construct the formula for the eigenvalues of the derivative based on the equation for A. As you have a 3x3 matrix that will possibly involve the roots of a cubic equation. You must write them out in explicit form. This all must be calculated ahead of time.
Then inside you substitute particular numeric values into the equations inside your ode function. It is important that you do not use eig and sort, because those do not use consistent orders and so you would fail the requirements for continuous derivatives of your equations.
  6 Kommentare
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Torsten
Torsten am 28 Okt. 2022
So you think that the three formulae for the three different branches don't follow the roots continuously ?
Bruno Luong
Bruno Luong am 28 Okt. 2022
Not differentiable continuously.
I think using consistent fomal radical formula doesn't ensure there is no branch swapping either.

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Torsten
Torsten am 26 Sep. 2022
Bearbeitet: Torsten am 27 Sep. 2022
See if it works. I cannot test it.
syms s
A = sym('A',[3 3]);
% Define characteristic polynomial
determinant = det(A-s*eye(3));
% Compute eigenvalues
lambda = solve(determinant==0,s,'MaxDegree',3)
% Compute d(lambda_k)/d(A(i,j))
for i = 1:3
for j = 1:3
for k = 1:3
d(k,i,j) = diff(lambda(k),A(i,j))
end
end
end
tspan = [0:0.01:1];
Azero = [0.4 0.1 0; 0.1 0.4 0.1; 0 0.1 0.2];
Adotzero = zeros(3,3);
[T,Av] = ode15i(@(t,Av, Avd)Adotxx(t, Av, Avd, d), tspan, tens2vec(Azero), tens2vec(Adotzero)); % Azero converted to vector style, this is another function
function res = Adotxx(t, Av, Avd, d)
A = sym('A',[3 3]);
Av = vec2tens(Av);
Avd = vec2tens(Avd);
d_num = zeros(3,3,3);
for i = 1:3
for j = 1:3
for k = 1:3
d_num(k,i,j) = double(subs(d(k,i,j),A,Av));
end
end
end
lambda_dot = zeros(3,1);
for k =1:3
lambda_dot(k) = 0.0;
for i = 1:3
for j = 1:3
lambda_dot(k) = lambda_dot(k) + d_num(k,i,j)*Avd(i,j);
end
end
end
alpha = 1;
f = @(A) A;
res = Avd - f(Av) - alpha*diag(lambda_dot);
res = tens2vec(res);
end
  4 Kommentare
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Hiroki ENDO
Hiroki ENDO am 28 Sep. 2022
Thank you again for your response!
I could understand that. Thanks again.
I will try it soon!
Hiroki ENDO
Hiroki ENDO am 28 Sep. 2022
I tried that code chaged by your advices.
And I put bellow code in function for derivative. It can see time record of calculation.
t=t
It works. But values of t become smaller and smaller. It never reaches over 0.01.
So, now I am using the profiler of MATLAB. I don't know if it works. I am seeking any ideas.
If you have any ideas, could you please teach me?
Thank you.

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Torsten
Torsten am 27 Sep. 2022
Bearbeitet: Torsten am 27 Sep. 2022
Here is a numerical code to solve your problem.
It's risky to use this approach since - as Walter Roberson noted - the ordering of the eigenvalues coming from "eig" might change during the computation. This will cause wrong results.
Thus the suggested symbolic approach from above is more safe.
tspan=[0:0.01:1];
Azero= [0.4 0.1 0; 0.1 0.4 0.1; 0 0.1 0.2];
[~, lambda] = eig(Azero);
lambda=[lambda(1,1),lambda(2,2),lambda(3,3)];
Azero = [Azero;lambda];
for i=1:4
for j=1:3
Av((i-1)*3+j) = Azero(i,j);
end
end
M = [eye(9),zeros(9,3);zeros(3,12)];
alpha = 0.2;
M(1,10) = -alpha;
M(5,11) = -alpha;
M(9,12) = -alpha;
options = odeset('Mass',M);%,'RelTol',1e-8,'AbsTol',1e-8);
[T,Av] = ode15s(@Adotxx, tspan, Av, options); % Azero converted to vector style, this is another function
plot(T,Av(:,12))
%%
function Ad = Adotxx(t, A)
for i=1:3
for j=1:3
Av(i,j) = A((i-1)*3+j);
end
L(i) = A(9+i);
end
[~, lambda] = eig(Av);
lambda = [lambda(1,1),lambda(2,2),lambda(3,3)];
% differential equation
Aderiv(1:3,1:3) = Av;
Aderiv(4,1:3) = L - lambda;
for i=1:4
for j=1:3
Ad((i-1)*3+j) = Aderiv(i,j);
end
end
Ad=Ad.';
end
  4 Kommentare
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Torsten
Torsten am 28 Sep. 2022
The numerical code from above takes about 1 second (under Octave).
Hiroki ENDO
Hiroki ENDO am 28 Sep. 2022
Oh. OK.
Thank you for replying.
I will try hard more.

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