Schwarz function

The Schwarz function, named for Hermann Schwarz, was introduced in a 1974 book by Philip J. Davis.^[1][2] It defines a method by which the Schwarz reflection principle may be generalized to reflection through arbitrary analytic curves in the complex plane, not just through the real axis. Given a non-singular, analytic Jordan arc ${\displaystyle \Gamma }$ in the complex plane, the Schwarz function ${\displaystyle S}$ is a uniquely determined analytic function on a neighborhood of ${\displaystyle \Gamma }$ with the property that ${\displaystyle S(z)=z^{*}}$ for every point ${\displaystyle z\in \Gamma }$.^[2]: 3

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