Let -$L$ be the circumcenter of $\triangle CMB$. -$K$ the intersection of the tangent to $\omega$ at $C$ and $AB$. -$T$ the intersection of the tangents to $\omega$ at $A,B$. Now, 1- Inversion at $K$ with radius $KC$ fix the three cirlcles, then $KD$ is tangent to $\omega$ at $D$. 2- $K$ belongs to the polar line of $T$ then $T$ belongs to the polar of $K$ which is $CD$. 3- $CT$ is the $C$-symmedian of $\triangle ACB$ then $\triangle CAD\sim\triangle CMB$. 4- There is a spiral similarity centered at $C$ wich sends $(C,A,D,O)$ to $(C,M,B,L)$, then $\angle CDO=\angle CBL$ which means that $L\in BE$.