Suppose $f$ is holomorphic on $D_{1}(0)$ the open unit disc. Let $\Gamma_{1} = \{z : |z| = 1, x>0, y>0\}$ where $z = x+iy$ and define $\Gamma_{2}, \Gamma_{3}, \Gamma_{4}$ similarly. On $\Gamma_{i}$, $|f(z)| \le M_{i}$. How can we show $|f(0)|\le (M_{1}M_{2}M_{3}M_{4})^{\frac{1}{4}}$?
Bounds on unit disc imply boundedness at origin
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1Perhaps I am missing some convention here, but why can I not define $f$ arbitrarily on the unit circle? There is no continuity assumption. So, choose $f(z) = \frac{1}{1-z}$ on the open unit disk, and $f(e^{i\theta}) = 0$, for $\theta \in [0,2\pi)$. – 2012-05-13
2 Answers
Hint: Consider $g(x) = f(x) f(ix) f(-x) f(-ix)$.
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0@JohnAdamski: no, the hint is not suggesting that at all. – 2012-05-14
Jensen's formula states that either f(0)=0 or $\log|f(0)|=\frac{1}{2\pi}\int_0^{2\pi}\log|f(re^{i\theta})|\,d\theta-\sum_{k=1}^n\log(\frac{r}{|a_k|})$ for any function $f$ analytic on a region containing $\overline{B(0;r)}$ with zeros $a_1, a_2, \ldots, a_n$ in $B(0;r)$, repeated according to multiplicity.
Therefore, for any $0
Letting $r\rightarrow1$, we have $\log|f(0)|\leq\frac{1}{4}(\log(M_1)+\log(M_2)+\log(M_3)+\log(M_4))$ $|f(0)|\leq(M_1M_2M_3M_4)^\frac{1}{4}$