Consider $R=C_0I\cap (A_0B_0C_0)$ and $P,Q=CI\cap A_0B_0,(ABC)$. 1- $H, P, R$ are collinear. This is a well known fact. 2- $\triangle HC_0R$ is homothetic to $\triangle IQN$. Proof: We know that $\triangle IA_0P\sim\triangle QNA$, then $\frac{QI}{QN}=\frac{QA}{QN}=\frac{IP}{IA_0}=\frac{2IP}{2IA_0}=\frac{C_0H}{C_0R}$, this fact combined with $C_0H\parallel QI$ and $C_0R\parallel QN$ complete the proof. 3- From the previous $HR\parallel NI$, then $NI$ pass through the midpoint of $HC_0$ which is $M$.