Schwarz reflection principle

In

, then it can be extended to the conjugate function on the lower half-plane. In notation, if ${\displaystyle F(z)}$ is a function that satisfies the above requirements, then its extension to the rest of the complex plane is given by the formula, $${\displaystyle F({\bar {z}})={\overline {F(z)}}.}$$

That is, we make the definition that agrees along the real axis.

The result proved by Hermann Schwarz is as follows. Suppose that F is a continuous function on the closed upper half plane ${\displaystyle \left\{z\in \mathbb {C} \mid \operatorname {Im} (z)\geq 0\right\}}$, holomorphic on the upper half plane ${\displaystyle \left\{z\in \mathbb {C} \mid \operatorname {Im} (z)>0\right\}}$, which takes real values on the real axis. Then the extension formula given above is an analytic continuation to the whole complex plane.^[1]

In practice it would be better to have a theorem that allows F certain singularities, for example F a

involving the extension of F clearly split into two, using part of the real axis. So, given that the principle is rather easy to prove in the special case from Morera's theorem, understanding the proof is enough to generate other results.

The principle also adapts to apply to harmonic functions.

• Kelvin transform
• Method of image charges
• Schwarz function

• "Riemann-Schwarz principle", Encyclopedia of Mathematics, EMS Press, 2001 [1994]
• Todd Rowland. "Schwarz reflection principle". MathWorld.