Title of article
Computation of Wengʹs rank 2 zeta function over an algebraic number field Original Research Article
Author/Authors
Tsukasa Hayashi، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2007
Pages
55
From page
473
To page
527
Abstract
In this paper, we study the zeta function, named non-abelian zeta function, defined by Lin Weng. We can represent Wengʹs rank r zeta function of an algebraic number field F as the integration of the Eisenstein series over the moduli space of the semi-stable OF-lattices with rank r. For r=2, in the case of image, Weng proved that it can be written by the Riemann zeta function, and Lagarias and Suzuki proved that it satisfies the Riemann hypothesis. These results were generalized by the author to imaginary quadratic fields and by Lin Weng to general number fields. This paper presents proofs of both these results. It derives a formula (first found by Weng) for Wengʹs rank 2 zeta functions for general number fields, and then proves the Riemann hypothesis holds for such zeta functions.
Keywords
Eisenstein series , Non-abelian zeta function , Semi-stable lattice
Journal title
Journal of Number Theory
Serial Year
2007
Journal title
Journal of Number Theory
Record number
716026
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