Menchoff's theorem

Statement

Let ${\displaystyle U\subset \mathbb{C}}$ be an open subset. A function ${\displaystyle f:U\to mathbbC}$ is holomorphic function iff the following two conditions hold:

• ${\displaystyle f}$ is continuous
• For any point ${\displaystyle z_0\in U}$, there exist two lines ${\displaystyle l,l^{\prime }}$ such that the following two limits:

${\displaystyle \underset{z\in l,z\to z_0}{lim}\frac{f(z)-f(z_0)}{z-z_0},\underset{z\in l^{\prime },z\to z_0}{lim}\frac{f(z)-f(z_0)}{z-z_0}}$

exist and are equal.

Related facts

• Looman-Menchoff theorem: This is a corollary of Menchoff's theorem, where the two lines at each point are chosen as the vertical and horizontal lines