"Appell hypergeometric series"의 두 판 사이의 차이
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| (사용자 2명의 중간 판 7개는 보이지 않습니다) | |||
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| + | ==메모== | ||
| + | * Clingher, Adrian, Charles F. Doran, and Andreas Malmendier. “Special Function Identities from Superelliptic Kummer Varieties.” arXiv:1510.06435 [math], October 21, 2015. http://arxiv.org/abs/1510.06435. | ||
* Bringmann, Kathrin, Jan Manschot, and Larry Rolen. “Identities for Generalized Appell Functions and the Blow-up Formula.” arXiv:1510.00630 [math], October 2, 2015. http://arxiv.org/abs/1510.00630. | * Bringmann, Kathrin, Jan Manschot, and Larry Rolen. “Identities for Generalized Appell Functions and the Blow-up Formula.” arXiv:1510.00630 [math], October 2, 2015. http://arxiv.org/abs/1510.00630. | ||
| − | * Matsumoto, Keiji, Takeshi Sasaki, Tomohide Terasoma, and Masaaki Yoshida. ‘An Example of Schwarz Map of Reducible Hypergeometric Equation | + | * Matsumoto, Keiji, Takeshi Sasaki, Tomohide Terasoma, and Masaaki Yoshida. ‘An Example of Schwarz Map of Reducible Hypergeometric Equation <math>E_2</math> in Two Variables’. arXiv:1503.07623 [math], 26 March 2015. http://arxiv.org/abs/1503.07623. |
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| + | == 노트 == | ||
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| + | ===말뭉치=== | ||
| + | # In this paper we present a finite field analogue for one of the Appell series.<ref name="ref_6c918006">[https://www.sciencedirect.com/science/article/pii/S1071579717300977 An Appell series over finite fields]</ref> | ||
| + | # Recently, finite field alanogues of Appell series F1, F2 and F3 are introduced and their relations with certain Gaussian hypergeometric series are established.<ref name="ref_4d1fb6be">[http://gyan.iitg.ernet.in/handle/123456789/1795 Appell series over finite fields and Gaussian hypergeometric series]</ref> | ||
| + | # We then establish finite field analogues of classical identities satisfied by the Appell series and hypergeometric series.<ref name="ref_4d1fb6be" /> | ||
| + | # We use properties of Gauss and Jacobi sums and our works on finite field Appell series to deduce these product formulas satisfied by the Gaussian hypergeometric series.<ref name="ref_4d1fb6be" /> | ||
| + | # In this paper we give a finite field analogue of Appell series and obtain some transformation and reduction formulas.<ref name="ref_15931b7e">[https://ui.adsabs.harvard.edu/abs/arXiv:1701.02674 Some new formulas for Appell series over finite fields]</ref> | ||
| + | # We also establish the generating functions for Appell series over finite fields.<ref name="ref_15931b7e" /> | ||
| + | # A FINITE FIELD ANALOGUE FOR APPELL SERIES F3 BING HE Abstract.<ref name="ref_0611877e">[https://vixra.org/pdf/1704.0093v1.pdf A finite field analogue for appell series f3]</ref> | ||
| + | # In this paper we introduce a nite eld analogue for the Appell series F3 and give some reduction formulae and certain generating functions for this function over nite elds.<ref name="ref_0611877e" /> | ||
| + | # Appell series F3 over nite elds, reduction formula, transformation formula, generating function.<ref name="ref_0611877e" /> | ||
| + | # In that paper, the nite eld analogue of the Appell series F1 was given by F1(A; B, B(cid:48); C; x, y) = (xy)AC(1) (cid:88) u A(u)AC(1 u)B(1 ux)B(cid:48)(1 uy).<ref name="ref_0611877e" /> | ||
| + | # The Appell series F2 is a hypergeometric series in two vari- ables that was introduced by Paul Appell in 1880 as generalization of Gauss hy- pergeometric series 2F1 of one variable.<ref name="ref_f3efc1cc">[http://www.cs.umsl.edu/~clingher/superkummer.pdf Asian j. math.]</ref> | ||
| + | # In 1933 Bailey derived a reduction formula for the Appell series F4 as product of two Gauss hypergeometric functions.<ref name="ref_f3efc1cc" /> | ||
| + | ===소스=== | ||
| + | <references /> | ||
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| + | == 메타데이터 == | ||
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| + | ===위키데이터=== | ||
| + | * ID : [https://www.wikidata.org/wiki/Q4780998 Q4780998] | ||
| + | ===Spacy 패턴 목록=== | ||
| + | * [{'LOWER': 'appell'}, {'LOWER': 'series'}] | ||
| + | * [{'LOWER': 'appell'}, {'LEMMA': 'series'}] | ||
| + | * [{'LOWER': 'appell'}, {'LOWER': 'hypergeometric'}, {'LEMMA': 'series'}] | ||
| + | * [{'LOWER': 'appell'}, {'LOWER': 'hypergeometric'}, {'LEMMA': 'function'}] | ||
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| + | [[분류:migrate]] | ||
2022년 7월 6일 (수) 19:52 기준 최신판
메모
- Clingher, Adrian, Charles F. Doran, and Andreas Malmendier. “Special Function Identities from Superelliptic Kummer Varieties.” arXiv:1510.06435 [math], October 21, 2015. http://arxiv.org/abs/1510.06435.
- Bringmann, Kathrin, Jan Manschot, and Larry Rolen. “Identities for Generalized Appell Functions and the Blow-up Formula.” arXiv:1510.00630 [math], October 2, 2015. http://arxiv.org/abs/1510.00630.
- Matsumoto, Keiji, Takeshi Sasaki, Tomohide Terasoma, and Masaaki Yoshida. ‘An Example of Schwarz Map of Reducible Hypergeometric Equation \(E_2\) in Two Variables’. arXiv:1503.07623 [math], 26 March 2015. http://arxiv.org/abs/1503.07623.
노트
말뭉치
- In this paper we present a finite field analogue for one of the Appell series.[1]
- Recently, finite field alanogues of Appell series F1, F2 and F3 are introduced and their relations with certain Gaussian hypergeometric series are established.[2]
- We then establish finite field analogues of classical identities satisfied by the Appell series and hypergeometric series.[2]
- We use properties of Gauss and Jacobi sums and our works on finite field Appell series to deduce these product formulas satisfied by the Gaussian hypergeometric series.[2]
- In this paper we give a finite field analogue of Appell series and obtain some transformation and reduction formulas.[3]
- We also establish the generating functions for Appell series over finite fields.[3]
- A FINITE FIELD ANALOGUE FOR APPELL SERIES F3 BING HE Abstract.[4]
- In this paper we introduce a nite eld analogue for the Appell series F3 and give some reduction formulae and certain generating functions for this function over nite elds.[4]
- Appell series F3 over nite elds, reduction formula, transformation formula, generating function.[4]
- In that paper, the nite eld analogue of the Appell series F1 was given by F1(A; B, B(cid:48); C; x, y) = (xy)AC(1) (cid:88) u A(u)AC(1 u)B(1 ux)B(cid:48)(1 uy).[4]
- The Appell series F2 is a hypergeometric series in two vari- ables that was introduced by Paul Appell in 1880 as generalization of Gauss hy- pergeometric series 2F1 of one variable.[5]
- In 1933 Bailey derived a reduction formula for the Appell series F4 as product of two Gauss hypergeometric functions.[5]
소스
메타데이터
위키데이터
- ID : Q4780998
Spacy 패턴 목록
- [{'LOWER': 'appell'}, {'LOWER': 'series'}]
- [{'LOWER': 'appell'}, {'LEMMA': 'series'}]
- [{'LOWER': 'appell'}, {'LOWER': 'hypergeometric'}, {'LEMMA': 'series'}]
- [{'LOWER': 'appell'}, {'LOWER': 'hypergeometric'}, {'LEMMA': 'function'}]