In my ODE class, we proved that if $\exp(L) = \exp(L')$ then the eigenvalues are congruent mod $2 \pi i$. Here, $L$ and $L'$ are two $n \times n$ matrices. I wanted to know if something more precise was true.
In a way, we should expect that matrix logs are multiple valued since this is the case in $\mathbb{C}$.
$$\log(r e^{i \theta}) = \log r + i\theta + 2 \pi i k$$
with $k \in \mathbb{Z}$. In this way we can construct an branched infinite cover of the complex plane.
We'll define multiplicity mod $2 \pi i$ of an eigenvalue $\lambda$ to be the number of eigenvalues congruent to $\lambda$ mod $2 \pi i$ up to multiplicity. If $\exp(L) = \exp(L')$ are the spectra of $L$ and $L'$ the same including multiplicity mod $2 \pi i$?
To put this another way, I could imagine two $5 \times 5$ matrices $\exp(L) = \exp(L')$ where
- the spectrum of $L$ is $(\lambda_1, \lambda_1, \lambda_2, \lambda_2 + 2 \pi i, \lambda_2 + 4 \pi i)$
while
- the spectrum of $L'$ is $(\lambda_1, \lambda_1, \lambda_1, \lambda_2 + 2 \pi i, \lambda_2 + 4 \pi i)$
Here the multiplicities mod $2 \pi i$ are different. One would be $(2,3)$ while the other would be $(3,2)$. Could $\exp(L) = \exp(L')$ in this case?
