Holomorphic function: Difference between revisions

Latest revision as of 19:13, 18 May 2008

Definition

Definition for one-variable function

Let $U$ be an open subset (not necessarily connected, though we can for practical purposes restrict ourselves to domains -- connected open subsets) of $C$ . A function $f : U \to C$ is termed a holomorphic function if it satisfies the following equivalent conditions:

$f$ is complex-differentiable at every point of $U$
$f$ is complex-differentiable at every point of $U$ , and the function $f^{'} : U \to C$ we obtain as the derivative, is a continuous function.
$f$ is infinitely often complex-differentiable. In other words, we can take the $n^{t h}$ derivative of $f$ for any $n$
For any point $z_{0} \in U$ , and any disc centered at $z_{0}$ of radius $r$ , that lies completely inside $U$ , $f$ can be expressed using a power series in $(z - z_{0})$
$f$ is a continuous function and satisfies the Cauchy-Riemann differential equations at every point in $U$
$f$ is a continuous function and its integral along the boundary of any triangle contained completely inside $U$ is zero.

Equivalence of definitions

For equivalence of (2), (3), (4), refer complex-analytic implies holomorphic and holomorphic implies complex-analytic
Goursat's lemma and Morera's theorem establish the equivalence of (1), (2) and (6)
Looman-Menchoff theorem establishes the equivalence with (5).

Definition on Riemann surfaces

Let $M$ be a Riemann surface. A holomorphic function on $M$ is a map from $M$ to $C$ whose restriction to any coordinate chart is a holomorphic function in the usual sense.