Let $\{p_n\}$ be a set of (complex) polynomials such that $$ \displaystyle \lim_{n\to \infty} p_n(z) =1$$, for all $z$ on the unit circle $C(0,1)$ (uniformly). How to show that this also holds (using the maximum modulus principle) that on the unit disc $D(0,1)$?
Approach: I've no idea how to start. I don't see in particular how I can use the max mod principle in this problem, so any hints/solutions are welcome. Thanks in advance!
EDIT: the maximum modulus principle says that a non constant holomorphic function (in a region) cannot attain it's maximum in that region.
For the sake of completenes of the answer data base:
If $p_n(z)$ converges uniformly to $1$ on the unit circle $S^1 \subset \Bbb C$, then for any real $\epsilon > 0$ we have a positive integer $N$ such that $m > N$ implies $\vert p_m(z) - 1 \vert < \epsilon$ on $S^1$. But $p_m (z) - 1$ is holomorphic in $D(0, 1)$ for all $m$, and hence, by the maximum modulus principle, $\vert p_m(z) - 1 \vert$ takes is greatest values on $S^1$. Hence,
$\vert p_m(z) - 1\vert_{D(0, 1)} \le \vert p_m(z) - 1 \vert_{S^1} < \epsilon \tag{1}$
for all $m > N$, whence $p_n(z) \to 1$ uniformly on $D(0, 1)$.