non linear eigen value problem
5 Ansichten (letzte 30 Tage)
Ältere Kommentare anzeigen
I want to find the eigen values of
k0=magic(2);
k1=1e-3*k0;
c1=[1 0;0 1]
c2=[0 1;1 0]
B=kron(c1,k0)+kron(c2,k1)
syms lambda1a lambda1b lambda2a lambda2b
x = sym('x',[size(B,2),1])
l1=[lambda1a;lambda1b ]
l2=[lambda2a;lambda2b ]
% lambda1 is 2 by 1 matrix and lambda2 is 2 by 1 matrix
% I want to solve the problem
B*x
(kron(diag(l1),c1)+kron(diag(l2),c2))*x
%I ant to find l1 and l2
3 Kommentare
Walter Roberson
am 19 Mär. 2023
l1 and l2 are each 2 x 1 matrices. You cannot take the eigenvalues of non-square matrices.
If you take eig(diag(l1)) and eig(diag(l2)) so that you are making them into 2 x 2 diagonal matrices, then the eigenvalues are just the contents of l1 and l2
Antworten (1)
Christine Tobler
am 27 Mär. 2023
This isn't the standard definition of a nonlinear eigenvalue problem, where you would have only one scalar lambda.
Am I understanding correctly that you are looking for four scalar values lambda... for which there exists an non-zero vector x which satisfies
B*x == (kron(diag(l1),c1)+kron(diag(l2),c2))*x
In that case, I would take this to the symbolic toolbox, by trying to solve for values of lambda... for which
det(B == (kron(diag(l1),c1)+kron(diag(l2),c2))) == 0
(using DET is fine for symbolic calculations, we only run into trouble using it when subjected to round-off error).
0 Kommentare
Siehe auch
Kategorien
Mehr zu Linear Algebra finden Sie in Help Center und File Exchange
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!