Open mapping theorem (complex analysis)

In complex analysis, the open mapping theorem states that if U is a connected open subset of the complex plane C and f : U → C is a non-constant holomorphic function, then f is an open map (i.e. it sends open subsets of U to open subsets of C).

The open mapping theorem points to the sharp difference between holomorphy and real-differentiability. On the real line, for example, the differentiable function f(x) = x² is not an open map, as the image of the open interval (−1,1) is the half-open interval [0,1).

The theorem for example implies that a non-constant holomorphic function cannot map an open disk onto a portion of any real line embedded in the complex plane.

Proof

Blue dots represent zeros of g(z). Black spikes represent poles. The boundary of the open set U is given by the dashed line. Note that all poles are exterior to the open set. The smaller red circle is the set B constructed in the proof.

Assume f:U → C is a non-constant holomorphic function and ${\displaystyle U}$ is a connected open subset of the complex plane. We have to show that every point in ${\displaystyle f(U)}$ is an interior point of ${\displaystyle f(U)}$, i.e. that every point in ${\displaystyle f(U)}$ is contained in a disk which is contained in ${\displaystyle f(U)}$.

Consider an arbitrary ${\displaystyle w_{0}}$ in ${\displaystyle f(U)}$. Then there exists a point ${\displaystyle z_{0}}$ in U such that ${\displaystyle w_{0}=f(z_{0})}$. Since U is open, we can find ${\displaystyle d>0}$ such that the closed disk ${\displaystyle B}$ around ${\displaystyle z_{0}}$ with radius d is fully contained in U. Since U is connected and f is not constant on U, we then know that f is not constant on B. Consider the function ${\displaystyle g(z)=f(z)-w_{0}}$. Note that ${\displaystyle z_{0}}$ is a root of the function.

We know that g(z) is not constant, and by further decreasing d, we can assure that g(z) has only a single root in B. (The roots of holomorphic non-constant functions are isolated.) Let e be the minimum of |g(z)| for z on the boundary of B, a positive number. (The boundary of B is a circle and hence a compact set, and |g(z)| is a continuous function, so the extreme value theorem guarantees the existence of this minimum.) Denote by ${\displaystyle D}$ the disk around ${\displaystyle w_{0}}$ with radius ${\displaystyle e}$. By Rouché's theorem, the function ${\displaystyle g(z)=f(z)-w_{0}}$ will have the same number of roots in B as ${\displaystyle f(z)-w}$ for any ${\displaystyle w}$ within a distance ${\displaystyle e}$ of ${\displaystyle w_{0}}$. Thus, for every ${\displaystyle w}$ in ${\displaystyle D}$, there exists one (and only one) ${\displaystyle z_{1}}$ in ${\displaystyle B}$ so that ${\displaystyle f(z_{1})=w}$. This means that the disk D is contained in ${\displaystyle f(B)}$, which is a subset of ${\displaystyle f(U)}$. Thus ${\displaystyle w_{0}}$ is an interior point of ${\displaystyle f(U)}$.

References

• Rudin, Walter (1966), Real & Complex Analysis, McGraw-Hill, ISBN 0-07-054234-1