expm function problem for stiff matrix

7 views (last 30 days)
Michal
Michal on 10 Jun 2021
Answered: Noorolhuda wyal on 22 Nov 2022
For very specific matrix A:
a = -1e20;
b = eps;
c = 1;
A = [a,0,b;0,c,0;-b,0,a];
disp('A:'), disp(num2str(A))
A:
-1e+20 0 2.220446049250313e-16
0 1 0
-2.220446049250313e-16 0 -1e+20
is known exact matrix exponential as:
expA = exp(a)*( ...
[1,0,0;0,0,0;0,0,1]*cos(b)+ ...
[0,0,1;0,0,0;-1,0,0]*sin(b))+ ...
[0,0,0;0,exp(c),0;0,0,0];
expA =
0 0 0
0 2.7183 0
0 0 0
the Matlab function expm give wrong result:
expm(A)
ans =
0 0 0
0 1 0
0 0 0
but direct computing of expm(A) via definition gives again right result:
[V,D] = eig(A);
expmA = V*diag(exp(diag(D)))/V
expmA =
0 0 0
0 2.7183 0
0 0 0
So, what is wrong with expm function? Bad implementation of Pade's approximation?
  5 Comments
Show 3 older comments
Matt J
Matt J on 10 Jun 2021
If they are linear ODEs, maybe you could solve them symbolically?
Michal
Michal on 10 Jun 2021
Symbolic solutions always ends on matrix exponentials and integration, which must be finally evaluated always numerically, so in this case by multi-precision arithmetic, which is sometimes very slow (especially with VPA in MATLAB). So, this problem is really hard ... :)

Sign in to comment.

Sign in to answer this question.

Accepted Answer

Shadaab Siddiqie
Shadaab Siddiqie on 18 Jun 2021
From my understanding you are getting wrong result for certain cases wile using expm function. This issue has been forwarded to the development team for further investigation.
  1 Comment
Michal
Michal on 18 Jun 2021
OK ... great! I am looking forward for any news regarding this topic.

Sign in to comment.

More Answers (2)

Bobby Cheng
Bobby Cheng on 12 Aug 2021
This is a weakness of the scaling and squaring algorithm. Inside EXPM, which you can read the implementation, there are special treatments for diagonal to deal with extreme cases, but it is only triggered if the input is of the Schur form due to performance. You can call SCHUR to create the Schur factorization, and pass the Schur form to EXPM to trigger the special diagonal treatment.
>> a = -1e20;
>> b = eps;
>> c = 1;
>> A = [a,0,b;0,c,0;-b,0,a];
>> [Q T] = schur(A);
>> Q*expm(T)*Q'
ans =
0 0 0
0 2.7183 0
0 0 0
  1 Comment
Fangcheng Huang
Fangcheng Huang on 1 Jun 2022
Edited: Fangcheng Huang on 1 Jun 2022
last line, Strange, when use matlab2022 it is right, but when use matlab 2020a, need to change Q*diag(exp(diag(T)))*Q'

Sign in to comment.

Noorolhuda wyal
Noorolhuda wyal on 22 Nov 2022
Ran in:
a = -1e20;
b = eps;
c = 1;
A = [a,0,b;0,c,0;-b,0,a];
B=vpa(A);
expmA=expm(B)
expmA = 

Categories

Find more on Linear Algebra in Help Center and File Exchange

Tags

Products


Release

R2021a

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!