Mean-value theorem: Difference between revisions
(New page: {{basic fact}} ==Statement== Suppose <math>U \subset \mathbb{C}</math> is an open subset and <math>f:U \to \mathbb{C}</math> is a holomorphic function. Let <math>R > 0</math> be such...) |
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<math>f(z_0) = \frac{1}{2\pi} \int_0^{2\pi} f(z_0 + Re^{it}) \, dt</math> | <math>f(z_0) = \frac{1}{2\pi} \int_0^{2\pi} f(z_0 + Re^{it}) \, dt</math> | ||
==Facts used== | |||
* [[Cauchy integral formula]]: In fact, the mean-value theorem is a direct consequence of the Cauchy integral formula, with the angle-based parametrization of the circle. | |||
Latest revision as of 19:16, 18 May 2008
This article gives the statement, and possibly proof, of a basic fact in complex analysis.
View a complete list of basic facts in complex analysis
Statement
Suppose is an open subset and is a holomorphic function. Let be such that the circle of radius centered at , lies completely inside , then:
Facts used
- Cauchy integral formula: In fact, the mean-value theorem is a direct consequence of the Cauchy integral formula, with the angle-based parametrization of the circle.