I have a question about Ahlfor's proof of modular function being a covering space of the twice punctured plane .See  Ahlfors' complex analysis, second edition, page 272. You can either explain or suggest a better reference.



Let $\Omega$ be defined by the open domain in $\mathbb{H} $  bounded by the lines $\Re(\tau)=0,\Re(\tau)=1, $ and the circle $|z-1/2|=1/2  $. ( $\Re$ means real part. )

In Ahlfors' complex analysis, second edition, page 272, Ahlfors proves that the modular function $\lambda $ maps $\Omega $ ( which is the open right half of the fundamental domain of the congruence subgroup modulo 2 group  $\Gamma(2)$ ) conformally onto the upper half plane $\mathbb{H} $ ( which, while combined with the fact $\lambda  o \phi = \lambda \forall \phi  \in  \Gamma(2) $ and that $\Omega \cup \Omega^* $$\cup  $ {positive y-axis}   is a fundamental domain for $\Gamma(2)$,( $\Omega^*$ is the reflection of $\Omega $ in the positive y- axis ) and that $\lambda$ is surjective,proves that $\lambda$ is a covering space for $\mathbb{C}\backslash{0,1}$.  

I have some questions regarding the proof of covering space :

1. How exactly do we prove that $\lambda : \mathbb{H} \to \mathbb{C}\backslash \{0,1} $ is surjective ? I think this should follow from the my queston # 2.

2. I am also unable to follow Ahlfors' argument on the first paragraph of P. 273, apparently which seems rather sketchy to me ( see P. 272 ) that  $ \forall  w_0\in \mathbb{H}, \frac{1}{2\pi i}\int_\Gamma \frac{\lambda'(\tau)}{\lambda(\tau)- \ w_0}d\tau = 1 $ and $ \forall  w_0\in \mathbb{H^*}, $ ( the lower half plane )$ \frac{1}{2\pi i}\int_\Gamma \frac{\lambda'(\tau)}{\lambda(\tau) -\ w_0}d\tau = 0 $ , where $\Gamma$ is obtained by taking the boundary of the truncated region truncated by $\Re(\tau)= t_0, $ where $t_0$ is sufficiently large, and two sufficiently small circles at 0 and 1. This will prove, by argument principle, that $\lambda$ takes each $ w_0 \in \mathbb{H} $ exactly once in $\Omega$. Could you please explain that in more detail ? Or suggest a better reference that is easier to follow ?

Thanks very much !