Cauchy integral formula for derivatives: Difference between revisions

Revision as of 13:50, 19 April 2008

Statement

Suppose $U$ is a domain in $C$ and $f : U \to C$ is a holomorphic function. Suppose $γ$ is the circle of radius $r$ centered at a point $z_{0} \in U$ , such that $γ$ lies completely inside $U$ . Then, for any point $z \in U$ , we have:

$f^{(n)} (z) = \frac{n!}{2 π i} \oint_{γ} \frac{f (ξ)}{(ξ - z)^{n + 1}} d ξ$

Applications

Cauchy estimates for derivatives

@@ Line 4: / Line 4: @@
 <math>f^{(n)}(z) = \frac{n!}{2\pi i} \oint_\gamma \frac{f(\xi)}{(\xi - z)^{n+1}} \, d\xi</math>
+==Applications==
+* [[Cauchy estimates for derivatives]]