I am reading the review paper "Aspects of Chern-Simons Theory" by Gerald Dunne
https://arxiv.org/abs/hep-th/9902115
Starting from p. 17, Dunne works on the Hamiltonian structure of the CS electromagnetism. When there is no Maxwell term, the CS action is given by
$$L = \frac{1}{2} \epsilon^{ij} \dot{A}_i A_j + A_0 B\tag{70}$$
where I set $\kappa = 1$, and this is given in his equation 70. The conjugate momenta is then
$$\Pi^i = \frac{\partial L}{\partial \dot{A}_i} = \frac{1}{2} \epsilon^{ij} A_j\tag{73}$$
which can also be found in his eq. (66) given that $e \rightarrow \infty$. The equal-time canonical commutation relations is then given by
$$\left[A_{i} (x) , \Pi^j (x) \right] = i \delta^j_i \delta^{2} (x-y)\tag{68}$$
which is given in his eq. (68). Then, he uses the definition of the conjugate momenta and finds that
$$\left[A_{i} (x) , A_j (x) \right] = i \epsilon_{ij} \delta^{2} (x-y).\tag{72}$$
I do not know how to get this result. Now let me write down what I got
\begin{equation} \left[A_{i} (x) , \Pi^j (x) \right] = \frac{1}{2} \epsilon^{jk} \left[A_{i} (x) , A_k (x) \right] \end{equation}
On the other hand, since $\left[A_{i} (x) , \Pi^j (x) \right] = i \delta^j_i \delta^{2} (x-y)$, we have
\begin{equation} i \delta^j_i \delta^{2} (x-y) = \frac{1}{2} \epsilon^{jk} \left[A_{i} (x) , A_k (x) \right] \end{equation}
Multiplying each side by $2 \epsilon_{jm}$ and using $\epsilon^{jm} \epsilon_{jn} = \delta^m_n$, i obtain \begin{equation} \left[A_{i} (x) , A_j (x) \right] = 2 i \epsilon_{ij} \delta^{2} (x-y) \end{equation}
Apparently i am missing a factor of 2, but i have no idea what i do wrong.
