Back تكامل محيطي Arabic انتگرالگیری کانتور Persian Méthodes de calcul d'intégrales de contour French Integrazione di contorno Italian 複素線積分 Japanese 경로적분법 Korean Contour integral SIMPLE Методе контурне интеграције Serbian Residykalkyl Swedish Kontür integrali yöntemleri Turkish
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In the mathematical field of complex analysis, contour integration is a method of evaluating certain integrals along paths in the complex plane.[1][2][3]
Contour integration is closely related to the calculus of residues,[4] a method of complex analysis.
One use for contour integrals is the evaluation of integrals along the real line that are not readily found by using only real variable methods. It also has various applications in physics.[5]
Contour integration methods include:
- direct integration of a complex-valued function along a curve in the complex plane
- application of the Cauchy integral formula
- application of the residue theorem
One method can be used, or a combination of these methods, or various limiting processes, for the purpose of finding these integrals or sums.
- ^ Stalker, John (1998). Complex Analysis: Fundamentals of the Classical Theory of Functions. Springer. p. 77. ISBN 0-8176-4038-X.
- ^ Bak, Joseph; Newman, Donald J. (1997). "Chapters 11 & 12". Complex Analysis. Springer. pp. 130–156. ISBN 0-387-94756-6.
- ^ Krantz, Steven George (1999). "Chapter 2". Handbook of Complex Variables. Springer. ISBN 0-8176-4011-8.
- ^ Mitrinović, Dragoslav S.; Kečkić, Jovan D. (1984). "Chapter 2". The Cauchy Method of Residues: Theory and Applications. Springer. ISBN 90-277-1623-4.
- ^ Mitrinović, Dragoslav S.; Kečkić, Jovan D. (1984). "Chapter 5". The Cauchy Method of Residues: Theory and Applications. Springer. ISBN 90-277-1623-4.
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