Definition:Primitive (Calculus)/Complex

Definition
Let $F: D \to \C$ be a complex function which is complex-differentiable on a connected domain $D$.

Let $f: D \to \C$ be a continuous complex function.

Let:
 * $\forall z \in D: \map {F'} z = \map f z$

where $F'$ denotes the derivative of $F$ $z$.

Then $F$ is a primitive of $f$, and is denoted:
 * $\ds F = \int \map f z \rd z$