"버치와 스위너톤-다이어 추측"의 두 판 사이의 차이
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Pythagoras0 (토론 | 기여) |
Pythagoras0 (토론 | 기여) |
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(같은 사용자의 중간 판 5개는 보이지 않습니다) | |||
89번째 줄: | 89번째 줄: | ||
==관련논문== | ==관련논문== | ||
− | + | * Bruin, Peter, and Andrea Ferraguti. “On <math>L</math>-Functions of Quadratic <math>\mathbb{Q}</math>-Curves.” arXiv:1511.09001 [math], November 29, 2015. http://arxiv.org/abs/1511.09001. | |
+ | * Ota, Kazuto. “Kato’s Euler System and the Mazur-Tate Refined Conjecture of BSD Type.” arXiv:1509.00682 [math], September 2, 2015. http://arxiv.org/abs/1509.00682. | ||
+ | * Balakrishnan, Jennifer, Ishai Dan-Cohen, Minhyong Kim, and Stefan Wewers. ‘A Non-Abelian Conjecture of Birch and Swinnerton-Dyer Type for Hyperbolic Curves’. arXiv:1209.0640 [math], 4 September 2012. http://arxiv.org/abs/1209.0640. | ||
* [http://www.mathnet.ru/eng/im1191 Finiteness of E(Q) and Sha(E, Q) for a subclass of Weil curves] | * [http://www.mathnet.ru/eng/im1191 Finiteness of E(Q) and Sha(E, Q) for a subclass of Weil curves] | ||
** V. Kolyvagin, (transl.) Math. USSR-Izv. 32 (1989), no. 3, 523--541 | ** V. Kolyvagin, (transl.) Math. USSR-Izv. 32 (1989), no. 3, 523--541 | ||
98번째 줄: | 100번째 줄: | ||
* [http://www.jstor.org/stable/2007967 On the Conjecture of Birch and Swinnerton-Dyer for an Elliptic Curve of Rank 3] | * [http://www.jstor.org/stable/2007967 On the Conjecture of Birch and Swinnerton-Dyer for an Elliptic Curve of Rank 3] | ||
** Joe P. Buhler, Benedict H. Gross and Don B. Zagier, Mathematics of Computation, Vol. 44, No. 170 (Apr., 1985), pp. 473-481 | ** Joe P. Buhler, Benedict H. Gross and Don B. Zagier, Mathematics of Computation, Vol. 44, No. 170 (Apr., 1985), pp. 473-481 | ||
+ | |||
+ | ==메타데이터== | ||
+ | ===위키데이터=== | ||
+ | * ID : [https://www.wikidata.org/wiki/Q671993 Q671993] | ||
+ | ===Spacy 패턴 목록=== | ||
+ | * [{'LOWER': 'john'}, {'LOWER': 'h.'}, {'LEMMA': 'Coates'}] | ||
+ | * [{'LOWER': 'john'}, {'LOWER': 'henry'}, {'LEMMA': 'Coates'}] | ||
+ | * [{'LOWER': 'john'}, {'LEMMA': 'Coates'}] |
2021년 2월 17일 (수) 03:47 기준 최신판
개요
- 타원곡선의 rank는 잘 알려져 있지 않다
- Birch and Swinnerton-Dyer 추측은 타원곡선의 rank에 대한 밀레니엄 추측의 하나이다
유리수해
- \(E(\mathbb{Q})=\mathbb{Z}^r \oplus E(\mathbb{Q})_{\operatorname{Tor}}\)
타원곡선의 L-함수
- Hasse-Weil 제타함수라고도 함
- 타원 곡선 E의 conductor가 N일 때, 다음과 같이 정의됨\[L(s,E)=\prod_p L_p (s,E)^{-1}\] 여기서 \[L_p(s,E)=\left\{\begin{array}{ll}(1-a_pp^{-s}+p^{1-2s}), & \mbox{if }p \nmid N \\ (1-a_pp^{-s}), & \mbox{if }p||N \\ 1, & \mbox{if }p^2|N \end{array}\right.\]
- 여기서 \(a_p\)는 유한체위에서의 해의 개수와 관련된 정수
추측
- \(E(\mathbb{Q})=\mathbb{Z}^r \oplus E(\mathbb{Q})_{\operatorname{Tor}}\)의 rank r은 \(\operatorname{Ord}_{s=1}L(s,E)\)와 같다
Coates-Wiles theorem
역사
- The Birch and Swinnerton-Dyer conjecture has been proved only in special cases :
- In 1976 John Coates and Andrew Wiles proved that if E is a curve over a number field F with complex multiplication by an imaginary quadratic field K of %28 number_theory %29 class number 1, F=K or Q, and L(E,1) is not 0 then E has only a finite number of rational points. This was extended to the case where F is any finite abelian extension of K by Nicole Arthaud-Kuhman, who shared an office with Wiles when both were students of Coates at Stanford.
- In 1983 Benedict Gross and Don Zagier showed that if a modular elliptic curve has a first-order zero at s = 1 then it has a rational point of infinite order; see E2 %80 %93 Zagier_theorem Gross\[DashZagier theorem].
- In 1990 Victor Kolyvagin showed that a modular elliptic curve E for which L(E,1) is not zero has rank 0, and a modular elliptic curve E for which L(E,1) has a first-order zero at s = 1 has rank 1.
- In 1991 Karl Rubin showed that for elliptic curves defined over an imaginary quadratic field K with complex multiplication by K, if the L-series of the elliptic curve was not zero at s=1, then the p-part of the Tate-Shafarevich group had the order predicted by the Birch and Swinnerton-Dyer conjecture, for all primes p > 7.
- In 1999 Andrew Wiles, Christophe Breuil, Brian Conrad, Fred Diamond and %28 mathematician %29 Richard Taylor proved that all elliptic curves defined over the rational numbers are modular (the Taniyama-Shimura theorem), which extends results 2 and 3 to all elliptic curves over the rationals.
- Nothing has been proved for curves with rank greater than 1, although there is extensive numerical evidence for the truth of the conjecture.
- 수학사 연표
메모
관련된 항목들
수학용어번역
- Birch - 발음사전 Forvo
- Swinnerton-Dyer - 발음사전 Forvo
사전 형태의 자료
리뷰, 에세이, 강의노트
- http://mattbakerblog.wordpress.com/2014/03/10/the-bsd-conjecture-is-true-for-most-elliptic-curves/
- Wiles, A. "The Birch and Swinnerton-Dyer Conjecture
관련논문
- Bruin, Peter, and Andrea Ferraguti. “On \(L\)-Functions of Quadratic \(\mathbb{Q}\)-Curves.” arXiv:1511.09001 [math], November 29, 2015. http://arxiv.org/abs/1511.09001.
- Ota, Kazuto. “Kato’s Euler System and the Mazur-Tate Refined Conjecture of BSD Type.” arXiv:1509.00682 [math], September 2, 2015. http://arxiv.org/abs/1509.00682.
- Balakrishnan, Jennifer, Ishai Dan-Cohen, Minhyong Kim, and Stefan Wewers. ‘A Non-Abelian Conjecture of Birch and Swinnerton-Dyer Type for Hyperbolic Curves’. arXiv:1209.0640 [math], 4 September 2012. http://arxiv.org/abs/1209.0640.
- Finiteness of E(Q) and Sha(E, Q) for a subclass of Weil curves
- V. Kolyvagin, (transl.) Math. USSR-Izv. 32 (1989), no. 3, 523--541
- Heegner points and derivatives of L-series. II
- Gross, B.; Kohnen, W.; Zagier, D. (1987), Mathematische Annalen 278 (1\[Dash]4): 497-562
- Heegner points and derivatives of L-series
- Gross, Benedict H.; Zagier, Don B. (1986), Inventiones Mathematicae 84 (2): 225-320
- On the Conjecture of Birch and Swinnerton-Dyer for an Elliptic Curve of Rank 3
- Joe P. Buhler, Benedict H. Gross and Don B. Zagier, Mathematics of Computation, Vol. 44, No. 170 (Apr., 1985), pp. 473-481
메타데이터
위키데이터
- ID : Q671993
Spacy 패턴 목록
- [{'LOWER': 'john'}, {'LOWER': 'h.'}, {'LEMMA': 'Coates'}]
- [{'LOWER': 'john'}, {'LOWER': 'henry'}, {'LEMMA': 'Coates'}]
- [{'LOWER': 'john'}, {'LEMMA': 'Coates'}]