"셀베르그 적분(Selberg integral)"의 두 판 사이의 차이

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* [[셀베르그 적분(Selberg integral)|Selberg 적분]]<br>
  
 
 
 
 
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* [[오일러 베타적분(베타함수)|오일러 베타적분]]의 일반화<br><math>\begin{align} S_{n} (\alpha, \beta, \gamma) & = \int_0^1 \cdots \int_0^1 \prod_{i=1}^n t_i^{\alpha-1}(1-t_i)^{\beta-1} \prod_{1 \le i < j \le n} |t_i - t_j |^{2 \gamma}\,dt_1 \cdots dt_n = \\ & = \prod_{j = 0}^{n-1}  \frac {\Gamma(\alpha + j \gamma) \Gamma(\beta + j \gamma) \Gamma (1 + (j+1)\gamma)}  {\Gamma(\alpha + \beta + (n+j-1)\gamma) \Gamma(1+\gamma)} \end{align}</math><br>
 
* [[오일러 베타적분(베타함수)|오일러 베타적분]]의 일반화<br><math>\begin{align} S_{n} (\alpha, \beta, \gamma) & = \int_0^1 \cdots \int_0^1 \prod_{i=1}^n t_i^{\alpha-1}(1-t_i)^{\beta-1} \prod_{1 \le i < j \le n} |t_i - t_j |^{2 \gamma}\,dt_1 \cdots dt_n = \\ & = \prod_{j = 0}^{n-1}  \frac {\Gamma(\alpha + j \gamma) \Gamma(\beta + j \gamma) \Gamma (1 + (j+1)\gamma)}  {\Gamma(\alpha + \beta + (n+j-1)\gamma) \Gamma(1+\gamma)} \end{align}</math><br>
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* [[오일러 베타적분(베타함수)|오일러 베타적분]]<br>
 
* [[오일러 베타적분(베타함수)|오일러 베타적분]]<br>
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* [[Chowla-셀베르그 공식]]<br>
  
 
 
 
 
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* 단어사전 http://www.google.com/dictionary?langpair=en|ko&q=
 
* 단어사전 http://www.google.com/dictionary?langpair=en|ko&q=
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* http://ko.wikipedia.org/wiki/
 
* http://ko.wikipedia.org/wiki/
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* http://www.wolframalpha.com/input/?i=
 
* http://www.wolframalpha.com/input/?i=
 
* [http://dlmf.nist.gov/ NIST Digital Library of Mathematical Functions]
 
* [http://dlmf.nist.gov/ NIST Digital Library of Mathematical Functions]
* [http://www.research.att.com/~njas/sequences/index.html The On-Line Encyclopedia of Integer Sequences]<br>
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* [http://www.research.att.com/%7Enjas/sequences/index.html The On-Line Encyclopedia of Integer Sequences]<br>
 
** http://www.research.att.com/~njas/sequences/?q=
 
** http://www.research.att.com/~njas/sequences/?q=
  
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* [http://dx.doi.org/10.1007/s11005-009-0330-7 On a Selberg–Schur Integral]<br>
 
* [http://dx.doi.org/10.1007/s11005-009-0330-7 On a Selberg–Schur Integral]<br>
 
** Sergio Manuel Iguri, 2009
 
** Sergio Manuel Iguri, 2009
* [http://www.maths.uq.edu.au/~uqowarna/talks/Wien.pdf Beta Integrals]<br>
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* [http://www.maths.uq.edu.au/%7Euqowarna/talks/Wien.pdf Beta Integrals]<br>
 
** S. Ole Warnaar
 
** S. Ole Warnaar
  
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*  도서내검색<br>
 
*  도서내검색<br>
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*  네이버 뉴스 검색 (키워드 수정)<br>
 
*  네이버 뉴스 검색 (키워드 수정)<br>
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*  구글 블로그 검색<br>
 
*  구글 블로그 검색<br>

2010년 5월 2일 (일) 12:31 판

이 항목의 스프링노트 원문주소

 

 

개요
  • 오일러 베타적분의 일반화
    \(\begin{align} S_{n} (\alpha, \beta, \gamma) & = \int_0^1 \cdots \int_0^1 \prod_{i=1}^n t_i^{\alpha-1}(1-t_i)^{\beta-1} \prod_{1 \le i < j \le n} |t_i - t_j |^{2 \gamma}\,dt_1 \cdots dt_n = \\ & = \prod_{j = 0}^{n-1} \frac {\Gamma(\alpha + j \gamma) \Gamma(\beta + j \gamma) \Gamma (1 + (j+1)\gamma)} {\Gamma(\alpha + \beta + (n+j-1)\gamma) \Gamma(1+\gamma)} \end{align}\)
  • n=1 인 경우
    \(S_{1} (\alpha, \beta,\gamma)=B(\alpha,\beta) = \int_0^1t^{\alpha-1}(1-t)^{\beta-1}\,dt\)

 

 

 

재미있는 사실

 

 

 

역사

 

 

 

메모

 

 

관련된 항목들

 

 

수학용어번역

 

 

사전 형태의 자료

 

 

관련논문

 

 

관련도서

 

 

관련기사

 

 

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