Let $U\subset\mathbb{C}^n$ be a domain of holomorphy.
The following proposition is true?
For each $a\in\partial U$, there is a holomorphic function $f\in H(U)$, such that $\displaystyle\sup_{j\ge 1} |f(z_j)|=\infty$ $($for all sequence $ (z_j)_{j\ge 1}\subset U$ such that $\lim_{j\to\infty} z_j=a)$.
Any hint would be appreciated.