Hecke L-functions

introduction

In 1920, Hecke introduced the notion of a Grossencharakter, an ideal class character of a number field, and established the analytic continuation and functional equation of its associated L-series, the Hecke L-series
In 1928, Artin proved his celebrated reciprocity law that every abelian L-function is in fact a Hecke L-function
In 1936, Chevalley introduced the concept of ideles and the idele group of an algebraic number field and reinterpreted Hecke's grossencharakter as characters of the idele class groups
In 1945, Artin and whaples defined the adele ring of an algebraic number field
In 1950, Tate carried out the suggestion of Artin to use harmonic analysis of adele groups to prove Hecke's theorems abour L-functions attached to grossencharacters
- for example, analytic continuation of classical \(\zeta\)-functions and Dirichlet \(L\)-functions
the following is taken from [Leahy2010]

In the early 20th century, Erich Hecke attempted to find a further generalization of the Dirichlet L-series and the Dedekind zeta function. In 1920, he introduced the notion of a Grossencharakter, an ideal class character of a number field, and established the analytic continuation and functional equation of its associated L-series, the Hecke L-series. In 1950, John Tate, following the suggestion of his advisor, Emil Artin, recast Hecke's work. Tate provided a more elegant proof of the functional equation of the Hecke L-series by using Fourier analysis on the adeles and employing a reformulation of the Grossencharakter in terms of a character on the ideles. Tate's work now is generally understood as the GL(1) case of automorphic forms

overview

A Hecke character (or Größencharakter) of a number field \(K\) is defined to be a quasicharacter of the idèle class group of \(K\)
Robert Langlands interpreted Hecke characters as automorphic forms on the reductive algebraic group GL(1) over the ring of adeles of \(K\)
Let \(E⁄K\) be an abelian Galois extension with Galois group \(G\)
Then for any character \(\sigma:G \to \mathbb{C}^{\times}\) (i.e. one-dimensional complex representation of the group \(G\)), there exists a Hecke character \(\chi\) of \(K\) such that

\[L_{E/K}^{\mathrm{Artin}}(\sigma, s) = L_{K}^{\mathrm{Hecke}}(\chi, s)\] where the left hand side is the Artin L-function associated to the extension with character \(\sigma\) and the right hand side is the Hecke \(L\)-function associated with \(\chi\)

Riemann zeta function

틀:수학노트

analytic continuation

자코비 세타함수를 이용하여, 리만제타함수를 복소평면 전체로 확장할 수 있음.\[\theta(\tau)= \sum_{n=-\infty}^\infty e^{\pi i n^2 \tau}\]

감마함수\[\Gamma(s) = \int_0^\infty e^{-t} t^{s} \frac{dt}{t}\] 를 이용하면, \[\int_0^\infty e^{-\pi n^2t} t^{\frac{s}{2}} \frac{dt}{t} = {\pi}^{-\frac{s}{2}}\Gamma(\frac{s}{2})\frac{1}{n^s}\]
형식적으로는 다음과 같은 적분에 의해, 리만제타함수를 얻을 수 있음.

\[\xi(s) : = \pi^{-s/2}\ \Gamma\left(\frac{s}{2}\right)\ \zeta(s)= \int_0^\infty (\frac{\theta(it)-1}{2})t^{\frac{s}{2}} \frac{dt}{t}\]

그러나 위의 적분은 모든 s에 대하여 수렴하지 않음. 따라서 다음과 같이 수정하여, 적분이 모든 s에 대하여 정의되도록 함.

\[\xi(s)=\pi^{-s/2}\Gamma(s/2)\zeta(s) = \frac{1}{s-1}-\frac{1}{s} +\frac{1}{2}\int_0^1 (\theta(it)-\frac{1}{\sqrt{t}})t^{\frac{s}{2}} \frac{dt}{t} +\frac{1}{2}\int_1^\infty (\theta(it)-1)t^{\frac{s}{2}} \frac{dt}{t}\]

여기서는 자코비 세타함수의 성질 \[\theta(iy)=\frac{1}{\sqrt{y}}\theta(\frac{i}{y})\] 이 사용됨.

함수방정식

리만제타함수는 \(s=\frac{1}{2}\) 에 대하여 대칭성을 가지고, 그에 따른 함수방정식을 만족시킴.\[\xi(s) = \xi(1 - s)\] 즉,\[\pi^{-s/2}\ \Gamma\left(\frac{s}{2}\right)\ \zeta(s)=\pi^{-(1-s)/2}\ \Gamma\left(\frac{1-s}{2}\right)\ \zeta(1-s)\]

증명

자코비 세타함수의 모듈라 성질을 사용하면, \[\int_0^1 (\theta(it)-\frac{1}{\sqrt{t}})t^{\frac{s}{2}} \frac{dt}{t}= \int_1^\infty (\theta(it)-1)t^{\frac{1-s}{2}} \frac{dt}{t}\]

이므로, \(\xi(s)\) 의 정의를 이용하면, \[\xi(s) = \frac{1}{s-1}-\frac{1}{s} +\frac{1}{2}\int_1^\infty (\theta(it)-1)t^{\frac{1-s}{2}} \frac{dt}{t}+\frac{1}{2}\int_1^\infty (\theta(it)-1)t^{\frac{s}{2}} \frac{dt}{t}\]

를 얻는다.

이 식에서 \(s \leftrightarrow 1-s\) 는 우변을 변화시키지 않음므로 함수방정식 \(\xi(s) = \xi(1 - s)\)을 얻는다. ■

Dirichlet L-functions

틀:수학노트

zeta integral

zeta integral

memo

http://math.stackexchange.com/questions/409200/functional-equation-for-hecke-l-series

related items

expositions

Kevin Buzzard Lecture Notes on L-functions
Alayont, Adelic approach to Dirichlet L-function
[Leahy2010] James-Michael Leahy, An introduction to Tate's Thesis
Herz, Carl, Stephen William Drury, and Maruti Ram Murty. 1997. Harmonic Analysis and Number Theory: Papers in Honour of Carl S. Herz : Proceedings of a Conference on Harmonic Analysis and Number Theory, April 15-19, 1996, McGill University, Montréal, Canada. American Mathematical Soc.

articles

Alexander Polishchuk, A-infinity algebras associated with elliptic curves and Eisenstein-Kronecker series, arXiv:1604.07888 [math.AG], April 26 2016, http://arxiv.org/abs/1604.07888
Thorner, Jesse, and Asif Zaman. “Explicit Results on the Distribution of Zeros of Hecke \(L\)-Functions.” arXiv:1510.08086 [math], October 27, 2015. http://arxiv.org/abs/1510.08086.
Zaman, Asif. “Explicit Estimates for the Zeros of Hecke L-Functions.” arXiv:1502.05679 [math], February 19, 2015. http://arxiv.org/abs/1502.05679.

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[{'LOWER': 'hecke'}, {'LEMMA': 'character'}]