Looman–Menchoff theorem

In the mathematical field of complex analysis, the Looman–Menchoff theorem states that a continuous complex-valued function defined in an open set of the complex plane is holomorphic if and only if it satisfies the Cauchy–Riemann equations. It is thus a generalization of a theorem by Édouard Goursat, which instead of assuming the continuity of f, assumes its Fréchet differentiability when regarded as a function from a subset of R² to R². This theorem bears the name of Dutch mathematician Herman Looman and Soviet mathematician Dmitrii Menshov.

Statement

A complete statement of the theorem is as follows:

Let Ω be an open set in C and f : Ω → C be a continuous function. Suppose that the partial derivatives and exist everywhere but a countable set in Ω. Then f is holomorphic if and only if it satisfies the Cauchy–Riemann equation:

Examples

Looman pointed out that the function given by f = exp for z ≠ 0, f = 0 satisfies the Cauchy–Riemann equations everywhere but is not analytic at z = 0. This shows that the function f must be assumed continuous in the theorem.
The function given by f = z⁵/|z|⁴ for z ≠ 0, f = 0 is continuous everywhere and satisfies the Cauchy–Riemann equations at z = 0, but is not analytic at z = 0. This shows that a naive generalization of the Looman–Menchoff theorem to a single point is false:

Let f be continuous at a neighborhood of a point z, and such that and exist at z. Then f is holomorphic at z if and only if it satisfies the Cauchy–Riemann equation at z.