The assumption of Morera's theorem is equivalent to that ƒ has an anti-derivative on D.
The converse of the theorem is not true in general. A holomorphic function need not possess an antiderivative on its domain, unless one imposes additional assumptions. The converse does hold e.g. if the domain is simply connected; this is Cauchy's integral theorem, stating that the line integral of a holomorphic function along a closed curve is zero.
There is a relatively elementary proof of the theorem. One constructs an anti-derivative for ƒ explicitly. The theorem then follows from the fact that holomorphic functions are analytic.
Without loss of generality, it can be assumed that D is connected. Fix a point z0 in D, and for any , let be a piecewise C1 curve such that and . Then define the function F to be
And it follows that
By continuity of f and the definition of the derivative, we get that F'(z) = f(z). Note that we can apply neither the Fundamental theorem of Calculus nor the mean value theorem since they are only true for real-valued functions.
Since f is the derivative of the holomorphic function F, it is holomorphic. This completes the proof.
Morera's theorem is a standard tool in complex analysis. It is used in almost any argument that involves a non-algebraic construction of a holomorphic function.
for every n, along any closed curve C in the disc. Then the uniform convergence implies that
for every closed curve C, and therefore by Morera's theorem ƒ must be holomorphic. This fact can be used to show that, for any open set Ω ⊆ C, the set A(Ω) of all bounded, analytic functions u : Ω → C is a Banach space with respect to the supremum norm.
Infinite sums and integrals
or the Gamma function
Specifically one shows that
for a suitable closed curve C, by writing
and then using Fubini's theorem to justify changing the order of integration, getting
Then one uses the analyticity of x ↦ xα−1 to conclude that
and hence the double integral above is 0. Similarly, in the case of the zeta function, the M-test justifies interchanging the integral along the closed curve and the sum.
Weakening of hypotheses
The hypotheses of Morera's theorem can be weakened considerably. In particular, it suffices for the integral
to be zero for every closed triangle T contained in the region D. This in fact characterizes holomorphy, i.e. ƒ is holomorphic on D if and only if the above conditions hold.
- Weisstein, Eric W., "Morera’s Theorem", MathWorld.
- Module for Morera's Theorem by John H. Mathews
- EoM article
bg:Теорема на Морера cs:Morerova věta de:Satz von Morera fa:قضیه موررا fr:Théorème de Morera ko:모레라의 정리 it:Teorema di Morera pl:Twierdzenie Morery ru:Теорема Мореры fi:Moreran lause tr:Morera teoremi uk:Теорема Морери zh:莫雷拉定理