Question: For $|z_0|<R$, I want to show that the mapping $$T(z)=\frac {R(z-z_0)} {R^2-\bar{z_0}z}$$ takes the open disc of radius $R$ $1-1$ and onto the unit disc and $z_0\rightarrow 0$.
Hint: Use the max modulus theorem and verify that $z_0\rightarrow0$ and $|z|=R\implies |T(z)|=1$.
this is how the question was posed with the hint.
Approach: I covered the automorphism $\phi_\alpha(z)=\frac{z-\alpha}{1-\bar{\alpha}z}$ of unit disc mapping onto a unit disc in class. But since $|z_0|<R$ inside the disc of radius R, I took $\frac{|z_0|}{R}<1$ and plugged it in $\phi$ to get $\phi_{\frac{z_0}{R}}=\frac{Rz-z_0}{R-\bar z_0z}$. Which is not what i want.
Also i tried the straight forward approach to show its 1-1 and onto, but the onto part looks like this: $$z=\frac{R^2w+Rz_0}{w\bar z_0+R}$$ Is this right? Also I'm so confused as to how to use the max modulus theorem in this case.
Any help would be greatly appreciated.
Thankyou!
d13: If you had divided both $z_0$ and $z$ by $R$, you'd map the disk of radius $R$ to the disk of radius $1$: Letting $\alpha = z_0/R$ and $Z=z/R$, $$T(z) = \frac{R(z-z_0)}{R^2-\bar z_0z} = \frac{R^2(Z-\alpha)}{R^2(1-\bar\alpha z)} = \frac{Z-\alpha}{1-\bar\alpha Z}\,,$$ with $|Z|<1$. Now we apply the standard knowledge about the automorphisms of the unit disk.