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| | In [[complex analysis]] a branch of mathematics, the '''residue at infinity''' is a [[Residue (complex analysis)|residue]] of a [[holomorphic function]] on an [[Annulus (mathematics)|annulus]] having an infinite external radius. The ''infinity'' <math>\infty</math> is a point added to the local space <math>\mathbb C </math> in order to render it [[compact space|compact]] (in this case it is a [[Alexandroff extension|one-point compactification]]). This space noted <math> \hat{\mathbb C} </math> is [[isomorphism|isomorphic]] to the [[Riemann sphere]].<ref>Michèle AUDIN, ''Analyse Complexe'', cursus notes of the university of Strasbourg [http://www-irma.u-strasbg.fr/~maudin/analysecomp.pdf available on the web], pp. 70–72</ref> One can use the residue at infinity to calculate some [[integral]]s. |
| | |
| | ==Definition== |
| | Given a holomorphic function ''f'' on an [[Annulus (mathematics)|annulus]] <math> A(0, R, \infty) </math> (centered at 0, with inner radius <math>R</math> and infinite outer radius), the '''residue at infinity''' of the function ''f'' can be defined in terms of the usual [[residue (mathematics)|residue]] as follows: |
| | |
| | :<math> \mathrm{Res}(f,\infty) = \mathrm{Res}\left( {-1\over z^2}f\left({1\over z}\right), 0 \right)</math> |
| | |
| | Thus, one can transfer the study of <math> f(z) </math> at infinity to the study of <math> f(1/z) </math> at the origin. |
| | |
| | Note that <math>\forall r > R</math>, we have |
| | |
| | :<math> \mathrm{Res}(f, \infty) = {-1\over 2\pi i}\int_{C(0, r)} f(z) \, dz</math> |
| | |
| | == See also == |
| | * [[Riemann sphere]] |
| | * [[Algebraic variety]] |
| | * [[Residue theorem]] |
| | |
| | == References == |
| | {{Translation/Ref|fr|Résidu à l'infini|oldid=59523358}} |
| | <references/> |
| | * Murray R. Spiegel, ''Variables complexes'', Schaum, ISBN 2-7042-0020-3 |
| | * [[Henri Cartan]], ''Théorie analytique des fonctions d'une ou plusieurs varaiables complexes'', Hermann, 1961 |
| | |
| | [[Category:Complex analysis]] |
In complex analysis a branch of mathematics, the residue at infinity is a residue of a holomorphic function on an annulus having an infinite external radius. The infinity 
is a point added to the local space 
in order to render it compact (in this case it is a one-point compactification). This space noted 
is isomorphic to the Riemann sphere.[1] One can use the residue at infinity to calculate some integrals.
Definition
Given a holomorphic function f on an annulus 
(centered at 0, with inner radius 
and infinite outer radius), the residue at infinity of the function f can be defined in terms of the usual residue as follows:
Thus, one can transfer the study of 
at infinity to the study of 
at the origin.
Note that 
, we have
See also
References
Template:Translation/Ref
- ↑ Michèle AUDIN, Analyse Complexe, cursus notes of the university of Strasbourg available on the web, pp. 70–72
- Murray R. Spiegel, Variables complexes, Schaum, ISBN 2-7042-0020-3
- Henri Cartan, Théorie analytique des fonctions d'une ou plusieurs varaiables complexes, Hermann, 1961