What is this equation for coin operator is trying to do in this quantum walk for Non-regular graph? This coin operator is called Fourier coin

I am reading the following paper: Discrete-time quantum walk on complex networks
for community detection by Kanae Mukai
We define the Coin operator $C$ by: $C=C_1otimes C_2….C_n$ , We define coin operator for Node $i, C_i:H_ito H_i$ is given by:

$C_i^F|ito j_1rangle|ito j_2rangle…….|ito j_krangle=(|ito j_1rangle|ito j_2rangle…….|i to j_krangle)1/sqrt(k_i) begin{pmatrix} 1 & 1 & 1 & … & 1 1 & e^{iotatheta/k_i} & e^{2iotatheta/k_i} & … & e^{(k_i-1)iotatheta/k_i} 1 & e^{2iotatheta/k_i} & e^{4iotatheta/k_i} & … & e^{2(k_i-1)iotatheta/k_i} . & . & . & . & .. & . & . & . & .. & . & . & . & . 1 & e^{(k_i-1)iotatheta/k_i} & e^{2(k_i-1)iotatheta/k_i} & … & e^{(k_i-1)(k_i-1)iotatheta/k_i}end{pmatrix}$
Here $k_i$ is the degree of $i^{th}$ node and $theta=2pi$. The author called this coin as Fourier Coin. And this $ito j$ implies that Node $i$ is going to hope to adjacent Node $j$.
Now, What is going on with this equation?