유수 정리 (residue theorem)

수학노트
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응용

\[\sum_{k=1}^{\infty}\frac{1}{k^{4}-a^4}=\frac{1}{2a^4}-\frac{\pi \cot (\pi a)}{4 a^3}-\frac{\pi \coth (\pi a)}{4 a^3}\] \[\sum_{n=-\infty}^{\infty}\frac{1}{n^2+n+1}=\frac{2\pi \tanh \left(\frac{\sqrt{3} \pi }{2}\right)}{\sqrt{3}}\]




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수학용어번역

  • residue - 대한수학회 수학용어집



사전 형태의 자료

노트

말뭉치

  1. Applying the Cauchy residue theorem.[1]
  2. The integral over this curve can then be computed using the residue theorem.[2]
  3. The new winding number allows to establish a generalized residue theorem which covers also the situation where singularities lie on the cycle.[3]
  4. This residue theorem can be used to calculate the value of improper integrals for which the standard technique with the classical residue theorem does not apply.[3]
  5. In the present article, we introduce a generalized, non-integer winding number for piecewise cycles and a general version of the residue theorem which covers all cases of singularities on .[3]
  6. Definition 2 of a generalized winding number turns out to be useful as it allows to generalize the residue theorem (see Theorem 8 below).[3]
  7. The Espil's theorem it's a short proof of the Cauchy's generalized residue theorem.[4]
  8. However, I decided to use the nuclear bomb of the integration arsenal, the Cauchy residue theorem of complex analysis.[5]
  9. In an upcoming topic we will formulate the Cauchy residue theorem.[6]
  10. 1 Residue theorem problems 2 2 Zero Sum theorem for residues problems 76 3 Power series problems 157 Acknowledgement.[6]
  11. The following result, Cauchy’s residue theorem, follows from our previous work on integrals.[6]
  12. Using residue theorem to compute an integral.[6]

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Spacy 패턴 목록

  • [{'LOWER': 'residue'}, {'LEMMA': 'theorem'}]
  • [{'LOWER': 'cauchy'}, {'LOWER': 'residue'}, {'LEMMA': 'theorem'}]
  • [{'LOWER': 'cauchy'}, {'LOWER': "'s"}, {'LOWER': 'residue'}, {'LEMMA': 'theorem'}]