Book contents
- Frontmatter
- Contents
- Dedication
- Liste des conférenciers
- On the Central Critical Value of the Triple Product L–Function
- Abelian extensions of complete discrete valuation fields
- Obstructions de Manin transcendantes
- On Selmer Groups of Adjoint Modular Galois Representations
- Algèbres de Hecke et corps locaux proches (une preuve de la conjecture de Howe pour GL(N) en caractéristique > 0)
- Aspects expérimentaux de la conjecture abc
- Heights of points on subvarieties of G
- Some applications of Diophantine approximations to Diophantine equations
- Fields containing values of algebraic functions and related questions
On the Central Critical Value of the Triple Product L–Function
Published online by Cambridge University Press: 19 March 2010
- Frontmatter
- Contents
- Dedication
- Liste des conférenciers
- On the Central Critical Value of the Triple Product L–Function
- Abelian extensions of complete discrete valuation fields
- Obstructions de Manin transcendantes
- On Selmer Groups of Adjoint Modular Galois Representations
- Algèbres de Hecke et corps locaux proches (une preuve de la conjecture de Howe pour GL(N) en caractéristique > 0)
- Aspects expérimentaux de la conjecture abc
- Heights of points on subvarieties of G
- Some applications of Diophantine approximations to Diophantine equations
- Fields containing values of algebraic functions and related questions
Summary
Introduction
Starting from the work of Garrett and of Piatetskii-Shapiro and Rallis on integral representations of the triple product L-function associated to three elliptic cusp forms the critical values of these L-functions have been studied in recent years from different points of view. From the classical point of view there are the works of Garrett [9], Satoh [22], Orloff [21], from an adelic point of view the problem has been treated by Garrett and Harris [10], Harris and Kudla [12] and Gross and Kudla [11]. Of course the central critical value is of particular interest. Harris and Kudla used the Siegel-Weil theorem to show that the central critical value is a square up to certain factors (Petersson norms and factors arising at the bad and the archimedean primes); the delicate question of the computation of the factors for the bad primes was left open. In the special situation that all three cusp forms are newforms of weight 2 and for the group 0(N) with square free level N > 1, Gross and Kudla gave for the first time a completely explicit treatment of this L-function including Euler factors for the bad places; they proved the functional equation and showed that the central critical value is a square up to elementary factors (that are explicitly given).
We reconsider the central critical value from a classical point of view, dealing with the situation of three cusp forms f1, f2, f3 of weights ki{ (i = 1,…, 3) that are newforms for groups Γ0(Ni) with N = lcm(Ni) a squarefree integer ≠ 1. The weights ki are subject to the restriction K1 < K2+K3 where K1 ≥ max(K2, K3);
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- Information
- Number TheorySéminaire de théorie des nombres de Paris 1993–94, pp. 1 - 46Publisher: Cambridge University PressPrint publication year: 1996
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