Jordan Decomposition for a certain matrix

Even the conjugacy classes with respect of block diagonal matrices $\text{diag}\,(a_{11},\ldots,a_{ee})$ are known. More precisely:

The matrix $A$ can be regarded as a cycle of homomorphisms $$ k^{n_1}\to k^{n_2}\to\ldots\to k^{n_e}\to k^{n_1}. $$ So it is a representation of the cyclic quiver of type $A_{e-1}^{(1)}$ whose representation theory is well known.

The indecomposable nilpotent blocks look as follows: pick $i$ between $1$ and $e$ and a nilpotence degree $N$. Then a basis of the vector space is $v_1,\ldots, v_N$ and $A$ acts as $Av_\nu=v_{\nu+1}$ and $Av_N=0$. Moreover $k^{n_j}$ is spanned by all $v_\nu$ with $j\equiv \nu+i-1 \text{ mod }e$ (so the $v_\nu$ circle around with period $e$ and starting point $i$). From this it is a purely combinatorial problem to find all possible Jordan forms. For example, a single Jordan block is only possible if the dimension vectors are of the form $(a+1,\ldots,a+1,a,\ldots,a)$ or a cyclic permutation thereof.

You can find more, e.g., in Kempken's thesis "Eine Darstellung$\ldots$" MR0666395 (84a:14022) of 1982.