Residue (mathematics): Difference between revisions

From Citizendium
Jump to navigation Jump to search
imported>Aleksander Stos
m (please...)
mNo edit summary
 
(11 intermediate revisions by 5 users not shown)
Line 1: Line 1:
In complex analysis, the '''residue'''  of a complex function ''f''  [[holomorphic]] in a neighbourhood <math>\Omega</math> of a point <math>z_0\in\mathbb{C}</math> is a particular number characterising behaviour of ''f'' around this point.
{{subpages}}
In complex analysis, the '''residue'''  of a function ''f''  [[holomorphic function|holomorphic]] in an open set <math>\Omega</math> with possible exception of a point <math>z_0\in\Omega</math> where the function may admit an [[isolated singularity]], is a particular number describing behaviour of ''f'' around <math>z_0</math>.


 
More precisely, if a function ''f'' is holomorphic in a neighbourhood of <math>z_0</math> (but not necessarily at <math>z_0</math> itself), with either a [[removable singularity]] or a [[pole (complex analysis)|pole]] at <math>z_0</math>, then it can be represented as a [[Laurent series]] around this point, that is
 
More formally, if a function ''f'' is holomorphic in a neighbourhood of <math>z_0</math>
then it can be represented as the Laurent series around this point, that is
:<math>f(z) = \sum_{n=-N}^\infty c_n (z-z_0)^n</math>
:<math>f(z) = \sum_{n=-N}^\infty c_n (z-z_0)^n</math>
with some <math>N\in \mathbb{N}</math> and coefficients <math>c_n\in \mathbb{C}.</math>  
with some <math>N\in \mathbb{N}\cup\{\infty\}</math> and coefficients <math>c_n\in \mathbb{C}.</math>  


The coefficient <math>c_{-1}</math> is the '''residue''' of ''f'' at <math>z_0</math>, denoted as
The coefficient <math>c_{-1}</math> is the '''residue''' of ''f'' at <math>z_0</math>, denoted as
<math>\mathrm{Res}(f,z_0)</math> or <math>\displaystyle\mathop{\mathrm{Res}}_{z=z_0}f.</math>
<math>\mathrm{Res}(f,z_0)</math> or <math>\underset{z=z_0}{\mathrm{Res}}f(z).</math>


Although the choice of the coefficient may look arbitrary, it turns out that it is well motivated by the particularly important role played by this number in the theory of complex functions.
Although the choice of the coefficient may look arbitrary, it turns out that it is well motivated by the particularly important role played by this number in the theory of complex functions.
For example, the residue allows to evaluate [[path integral]]s of the function ''f'' via the [[residue theorem]]. This technique finds many applications in real analysis as well.
For example, the residue allows to evaluate [[path integral]]s of the function ''f'' via the [[residue theorem]]. This technique finds many applications in real analysis as well.[[Category:Suggestion Bot Tag]]
 
[[Category:CZ Live]]
[[Category:Mathematics Workgroup]]
[[Category:Stub Articles]]

Latest revision as of 11:00, 11 October 2024

This article is a stub and thus not approved.
Main Article
Discussion
Related Articles  [?]
Bibliography  [?]
External Links  [?]
Citable Version  [?]
 
This editable Main Article is under development and subject to a disclaimer.

In complex analysis, the residue of a function f holomorphic in an open set with possible exception of a point where the function may admit an isolated singularity, is a particular number describing behaviour of f around .

More precisely, if a function f is holomorphic in a neighbourhood of (but not necessarily at itself), with either a removable singularity or a pole at , then it can be represented as a Laurent series around this point, that is

with some and coefficients

The coefficient is the residue of f at , denoted as or

Although the choice of the coefficient may look arbitrary, it turns out that it is well motivated by the particularly important role played by this number in the theory of complex functions. For example, the residue allows to evaluate path integrals of the function f via the residue theorem. This technique finds many applications in real analysis as well.