"Kohnen-Waldspurger formula"의 두 판 사이의 차이
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==introduction== | ==introduction== | ||
| + | * study central values and derivatives of weight 2 modular L-functions | ||
| + | * let <math>g(z)</math> be a Kohnen newform | ||
| + | * There is a unique newform, say <math>f(z)\in S^{\text{new}}_{2k}(N)</math>, associated to <math>g(z)</math> under Shimura's correspondence. | ||
| + | * The coefficients of <math>g(z)</math> determine the central critical values of many of the quadratic twists <math>L(f, \chi_D, s)</math> | ||
| + | |||
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| + | ==formula== | ||
| + | * There is a modular form <math>g(z)=\sum b_{E}(n)q^n</math> such that if <math>\epsilon()=1</math>, | ||
| + | :<math>L(E(\Delta),1)=\alpha(\cdots)b_{E}(\Delta)^{2}</math> | ||
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| + | |||
| + | ==history== | ||
* In the 1980s, Waldspurger [205], and Kohnen and Zagier [135, 136, 137] established that certain half-integral weight modular forms serve as generating functions of a new type. | * In the 1980s, Waldspurger [205], and Kohnen and Zagier [135, 136, 137] established that certain half-integral weight modular forms serve as generating functions of a new type. | ||
* Using the Shimura correspondence [192], they proved that certain coefficients of half-integral weight cusp forms essentially are square-roots of central values of quadratic twists of modular L-functions. | * Using the Shimura correspondence [192], they proved that certain coefficients of half-integral weight cusp forms essentially are square-roots of central values of quadratic twists of modular L-functions. | ||
| + | * Ono and Bruinier [67] have generalized this theorem of Waldspurger and Kohnen to prove that the Fourier coefficients of weight 1/2 harmonic Maass forms encode the vanishing and nonvanishing of both the central values and derivatives of quadratic twists of weight 2 modular L-functions. | ||
| + | ** [[Mock modular periods and L-functions]] | ||
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==related items== | ==related items== | ||
| + | * [[Shimura correspondence]] | ||
* [[Gross-Zagier formula]] | * [[Gross-Zagier formula]] | ||
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| + | ==expositions== | ||
| + | * RAMAKRISHNAN, B. "MODULAR FORMS OF HALF-INTEGRAL WEIGHT." THE MATHEMATICS STUDENT: 101. http://indianmathsociety.org.in/mathstudent2012.pdf#page=104 | ||
| + | * [[Unearthing the visions of a master: harmonic Maass forms and number theory]] | ||
| + | ** chapter 15 | ||
==articles== | ==articles== | ||
| + | * Nicolás Sirolli, Gonzalo Tornaría, An explicit Waldspurger formula for Hilbert modular forms, http://arxiv.org/abs/1603.03753v1 | ||
| + | * Sergey Lysenko, Geometric Waldspurger periods II, http://arxiv.org/abs/1308.6531v2 | ||
| + | * Wen, Jun. “Orthogonal Periods and Central Values of Rankin-Selberg L-Functions of <math>GL_3 {\times} GL_2</math>.” arXiv:1512.09222 [math], December 31, 2015. http://arxiv.org/abs/1512.09222. | ||
| + | * Liu, Yifeng, Shouwu Zhang, and Wei Zhang. “On <math>p</math>-Adic Waldspurger Formula.” arXiv:1511.08172 [math], November 25, 2015. http://arxiv.org/abs/1511.08172. | ||
| + | * Cooper, Ian A., Patrick W. Morris, and Nina C. Snaith. “Beyond the Excised Ensemble: Modelling Elliptic Curve L-Functions with Random Matrices.” arXiv:1511.05805 [math-Ph], November 18, 2015. http://arxiv.org/abs/1511.05805. | ||
| + | * Wen, Jun. “Bhargava’s Composition Law and Waldspurger’s Central Value Theorem.” arXiv:1510.07334 [math], October 25, 2015. http://arxiv.org/abs/1510.07334. | ||
| + | * Schwagenscheidt, Markus. ‘Nonvanishing and Central Critical Values of Twisted <math>L</math>-Functions of Cusp Forms on Average’. arXiv:1502.02492 [math], 9 February 2015. http://arxiv.org/abs/1502.02492. | ||
| + | * [67] Bruinier, Jan H., and Ken Ono. 2007. “Heegner Divisors, <math>L</math>-Functions and Harmonic Weak Maass Forms.” arXiv:0710.0283 [math] (October 1). http://arxiv.org/abs/0710.0283., Annals of Mathematics | ||
* [135] W. Kohnen, Newforms of half-integral weight, J. Reine Angew. Math. 333 (1982) 32-72. | * [135] W. Kohnen, Newforms of half-integral weight, J. Reine Angew. Math. 333 (1982) 32-72. | ||
* [136] W. Kohnen, Fourier coefficients of modular forms of half-integral weight, Math. Ann. 271 (1985), 237-268. http://www.springerlink.com/content/p52527460724p36m/ | * [136] W. Kohnen, Fourier coefficients of modular forms of half-integral weight, Math. Ann. 271 (1985), 237-268. http://www.springerlink.com/content/p52527460724p36m/ | ||
* [137] W. Kohnen and D. Zagier, Values of L-series of modular forms at the center of the critical strip, Invent. Math. 64 (1981), no. 2, pages 175–198. | * [137] W. Kohnen and D. Zagier, Values of L-series of modular forms at the center of the critical strip, Invent. Math. 64 (1981), no. 2, pages 175–198. | ||
* [205] J.-L. Waldspurger, Sur les coefficients de Fourier des formes modulaires de poids demi-entier, J. Math. Pures Appl. (9) 60 (1981), no. 4, pages 375–484. | * [205] J.-L. Waldspurger, Sur les coefficients de Fourier des formes modulaires de poids demi-entier, J. Math. Pures Appl. (9) 60 (1981), no. 4, pages 375–484. | ||
| + | [[분류:theta]] | ||
| + | [[분류:migrate]] | ||
2020년 11월 13일 (금) 00:30 기준 최신판
introduction
- study central values and derivatives of weight 2 modular L-functions
- let \(g(z)\) be a Kohnen newform
- There is a unique newform, say \(f(z)\in S^{\text{new}}_{2k}(N)\), associated to \(g(z)\) under Shimura's correspondence.
- The coefficients of \(g(z)\) determine the central critical values of many of the quadratic twists \(L(f, \chi_D, s)\)
formula
- There is a modular form \(g(z)=\sum b_{E}(n)q^n\) such that if \(\epsilon()=1\),
\[L(E(\Delta),1)=\alpha(\cdots)b_{E}(\Delta)^{2}\]
history
- In the 1980s, Waldspurger [205], and Kohnen and Zagier [135, 136, 137] established that certain half-integral weight modular forms serve as generating functions of a new type.
- Using the Shimura correspondence [192], they proved that certain coefficients of half-integral weight cusp forms essentially are square-roots of central values of quadratic twists of modular L-functions.
- Ono and Bruinier [67] have generalized this theorem of Waldspurger and Kohnen to prove that the Fourier coefficients of weight 1/2 harmonic Maass forms encode the vanishing and nonvanishing of both the central values and derivatives of quadratic twists of weight 2 modular L-functions.
expositions
- RAMAKRISHNAN, B. "MODULAR FORMS OF HALF-INTEGRAL WEIGHT." THE MATHEMATICS STUDENT: 101. http://indianmathsociety.org.in/mathstudent2012.pdf#page=104
- Unearthing the visions of a master: harmonic Maass forms and number theory
- chapter 15
articles
- Nicolás Sirolli, Gonzalo Tornaría, An explicit Waldspurger formula for Hilbert modular forms, http://arxiv.org/abs/1603.03753v1
- Sergey Lysenko, Geometric Waldspurger periods II, http://arxiv.org/abs/1308.6531v2
- Wen, Jun. “Orthogonal Periods and Central Values of Rankin-Selberg L-Functions of \(GL_3 {\times} GL_2\).” arXiv:1512.09222 [math], December 31, 2015. http://arxiv.org/abs/1512.09222.
- Liu, Yifeng, Shouwu Zhang, and Wei Zhang. “On \(p\)-Adic Waldspurger Formula.” arXiv:1511.08172 [math], November 25, 2015. http://arxiv.org/abs/1511.08172.
- Cooper, Ian A., Patrick W. Morris, and Nina C. Snaith. “Beyond the Excised Ensemble: Modelling Elliptic Curve L-Functions with Random Matrices.” arXiv:1511.05805 [math-Ph], November 18, 2015. http://arxiv.org/abs/1511.05805.
- Wen, Jun. “Bhargava’s Composition Law and Waldspurger’s Central Value Theorem.” arXiv:1510.07334 [math], October 25, 2015. http://arxiv.org/abs/1510.07334.
- Schwagenscheidt, Markus. ‘Nonvanishing and Central Critical Values of Twisted \(L\)-Functions of Cusp Forms on Average’. arXiv:1502.02492 [math], 9 February 2015. http://arxiv.org/abs/1502.02492.
- [67] Bruinier, Jan H., and Ken Ono. 2007. “Heegner Divisors, \(L\)-Functions and Harmonic Weak Maass Forms.” arXiv:0710.0283 [math] (October 1). http://arxiv.org/abs/0710.0283., Annals of Mathematics
- [135] W. Kohnen, Newforms of half-integral weight, J. Reine Angew. Math. 333 (1982) 32-72.
- [136] W. Kohnen, Fourier coefficients of modular forms of half-integral weight, Math. Ann. 271 (1985), 237-268. http://www.springerlink.com/content/p52527460724p36m/
- [137] W. Kohnen and D. Zagier, Values of L-series of modular forms at the center of the critical strip, Invent. Math. 64 (1981), no. 2, pages 175–198.
- [205] J.-L. Waldspurger, Sur les coefficients de Fourier des formes modulaires de poids demi-entier, J. Math. Pures Appl. (9) 60 (1981), no. 4, pages 375–484.