Editing Contour integration (section)

===As a generalization of the Riemann integral===
The generalization of the [[Riemann integral]] to functions of a complex variable is done in complete analogy to its definition for functions from the real numbers. The partition of a directed smooth curve <math>\gamma</math> is defined as a finite, ordered set of points on <math>\gamma</math>. The integral over the curve is the limit of finite sums of function values, taken at the points on the partition, in the limit that the maximum distance between any two successive points on the partition (in the two-dimensional complex plane), also known as the mesh, goes to zero.