Geometric function theory

Geometric function theory is the study of geometric properties of analytic functions. A fundamental result in the theory is the Riemann mapping theorem.

Let ${\displaystyle z_{0}}$ be a point in a simply-connected region ${\displaystyle D_{1}(D_{1}\neq \mathbb {C} )}$ and ${\displaystyle D_{1}}$ having at least two boundary points. Then there exists a unique analytic function ${\displaystyle w=f(z)}$ mapping ${\displaystyle D_{1}}$ bijectively into the open unit disk ${\displaystyle |w|<1}$ such that ${\displaystyle f(z_{0})=0}$ and ${\displaystyle f'(z_{0})>0}$.

It should be noted that while Riemann's mapping theorem demonstrates the existence of a mapping function, it does not actually exhibit this function.

In the above figure, consider ${\displaystyle D_{1}}$ and ${\displaystyle D_{2}}$ as two simply connected regions different from ${\displaystyle \mathbb {C} }$. The Riemann mapping theorem provides the existence of ${\displaystyle w=f(z)}$ mapping ${\displaystyle D_{1}}$ onto the unit disk and existence of ${\displaystyle w=g(z)}$ mapping ${\displaystyle D_{2}}$ onto the unit disk. Thus ${\displaystyle g^{-1}f}$ is a one-to-one mapping of ${\displaystyle D_{1}}$ onto ${\displaystyle D_{2}}$. If we can show that ${\displaystyle g^{-1}}$, and consequently the composition, is analytic, we then have a conformal mapping of ${\displaystyle D_{1}}$ onto ${\displaystyle D_{2}}$, proving "any two simply connected regions different from the whole plane ${\displaystyle \mathbb {C} }$ can be mapped conformally onto each other."

Of special interest are those complex functions which are one-to-one. That is, for points ${\displaystyle z_{1}}$, ${\displaystyle z_{2}}$, in a domain ${\displaystyle D}$, they share a common value, ${\displaystyle f(z_{1})=f(z_{2})}$ only if they are the same point ${\displaystyle z_{1}=z_{2}}$. A function ${\displaystyle f}$ analytic in a domain ${\displaystyle D}$ is said to be univalent there if it does not take the same value twice for all pairs of distinct points ${\displaystyle z_{1}}$ and ${\displaystyle z_{2}}$ in ${\displaystyle D}$, i.e. ${\displaystyle f(z_{1})\neq f(z_{2})}$ implies ${\displaystyle z_{1}\neq z_{2}}$. Alternate terms in common use are schlicht( this is German for plain, simple) and simple. It is a remarkable fact, fundamental to the theory of univalent functions, that univalence is essentially preserved under uniform convergence.

• Krantz, Steven (2006). Geometric Function Theory: Explorations in Complex Analysis. Springer. ISBN 0-8176-4339-7.
• Noor, K.I. Lecture notes on Introduction to Univalent Functions. CIIT, Islamabad, Pakistan.
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