Let $ F$ be the intersection of $ AD$ and $ \mathcal C$. Then $ \frac {C_1D}{CF} = \frac {AC_1}{AC} = \frac {R_1}{R}$ gives that $ CF \parallel C_1D$. Since $ C_1D \parallel C_2E$, so $ CF \parallel C_2E$. Since $ \frac {C_2E}{CF} = \frac {BC_2}{BC}$, so $ B$, $ E$ and $ F$ are collinear. Therefore the intersection of $ AD$ and $ BE$ lies on the circle $ \mathcal C$

Let DE intersect the circle C at M and N; it is then well known that AD is the internal angle bisector of $ \angle MAN$. Similarly BE is the angle bisector of $ \angle MBN$ and F is the middle of the arc MN. Best regards, sunken rock