descriptionPublicationkeyboard_double_arrow_right Article 01 Mar 1956Publisher:JSTORJournal:The Annals of Mathematics, volume 63, page 336 (issn: 0003-486X,

Authors: Bochner, Salomon; Chandrasekharan, K.;

doi: 10.2307/1969614

On Riemann's Functional Equation

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Abstract

constant factor) if it satisfies Riemann's functional equation. This result was placed in an altogether more general setting by Hecke's work [9] on the correspondence between Dirichlet series with given signature (introduced by him), and modular functions. This paper is also concerned with that problem, but from a different approach. Hamburger's theorem [16, p. 31] states that if G(s) is an entire function of finite order, P(s) a polynomial, and f(s) = G(s)/P(s), and

Keywords

\(\zeta (s)\) and \(L(s, \chi)\), functional equation, Riemann zeta-function

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