Case 5a. has repeated eigenvalue and one independent eigenvector
- Origin is an improper source/degenerate source
- Unstable b/c only eigenvalue we have is
Case 5b. has repeated eigenvalue and one independent eigenvector
- Origin is an improper source/degenerate source
- Stable b/c only eigenvalue we have is
Fundamental matrix
Let
Then the general solution to the system
Let
- We can still obtain one solution
- Next, we generate another solution
based on our current eigenvalue/eigenvector
WARNING: The second solution won’t be as nice asas we saw earlier
Generalized Eigenvector of with rank
Let
be an matrix and suppose that is an eigenvalue of . We say that a nonzero vector is a generalized eigenvector of with rank (corresponding to ) provided that for all integers .
Jordan Chain of Independent Vectors
If
is a generalized eigenvector of with rank then there exists a Jordan Chain of independent vectors (corresponding to ) such that
Note: An eigenvector is a generalized eigenvector of rank 1
Fact
If
is a Jordan chain of corresponding to then
are all solutions to
Basically, if
where
Summary
Consider a system of two first-order ODEs
The equivalent matrix form (normal form) of this system is given by
There are three cases:
has two distinct, real eigenvalues
Letbe the eigenvalues, and let be the corresponding eigenvector. Then the general solution to is given by
has complex eigenvalues
Here, the eigenvalues and eigenvectors must occur as conjugate pairs. So we letdenote the eigenvalues and denote the corresponding eigenvectors. Then the general solution to is given by
- A has repeated eigenvalue
There are two sub-cases:
3a. Ifhas two linearly independent eigenvectors . Then the general solution to is given by
3b. Ifhas only one eigenvector then we need to solve the system of algebraic equations
for any solution. Then the general solution to is