Hasse-Weil zeta function of absolutely irreducible SL2-representations of the figure 8 knot group Shinya Harada∗ 0 Introduction The figure 8 knot K is known as a unique arithmetic knot, i.e., the knot complement S 3 rK

Source URL: staff.miyakyo-u.ac.jp

• Mathematics
• Abstract algebra
• Algebra
• Analytic number theory
• Algebraic number theory
• Algebraic geometry
• HasseWeil zeta function
• Elliptic curve
• Dedekind zeta function
• Bernhard Riemann
• Representation theory
• Riemann zeta function

French-Japanese Workshop on multiple zeta functions and applications. Saint-Etienne, 7-9 September 2015 Titles and abstracts of talks. 1

Source URL: dossier.univ-st-etienne.fr

• Mathematics
• Mathematical analysis
• Number theory
• Mathematical constants
• Special functions
• Multiple zeta function
• Bernoulli number
• L-function
• Polylogarithm
• Ring of periods
• Dedekind zeta function
• Dirichlet series

On Arithmetically Equivalent Number Fields of Small Degree Wieb Bosma1 and Bart de Smit2 1 Mathematisch Instituut, Universiteit Nijmegen

Source URL: www.math.ru.nl

• Algebra
• Abstract algebra
• Ring theory
• Field theory
• Algebraic number theory
• Galois theory
• Algebraic structures
• Gassmann triple
• Splitting of prime ideals in Galois extensions
• Splitting field
• Dedekind zeta function
• Algebraic number field

RACSAM manuscript No. (will be inserted by the editor) On a factorization of Riemann’s ζ function with respect to a quadratic field and its computation Xavier Ros-Oton

Source URL: www.ma.utexas.edu

• Integer sequences
• Analytic number theory
• Combinatorics
• Bernoulli number
• Topology
• Riemann zeta function
• Factorial
• Dedekind zeta function
• Dirichlet character
• Mathematics
• Mathematical analysis
• Number theory

CLASSICAL AND ELLIPTIC POLYLOGARITHMS AND SPECIAL VALUES OF L-SERIES Don Zagier and Herbert Gangl1 The Dirichlet class number formula expresses the residue at s = 1 of the Dedekind zeta function ζF (s) of an arbitrary a

Source URL: people.mpim-bonn.mpg.de

P ROOF OF THE R IEMANN H YPOTHESIS CARLES F. PRADAS PRELIMINARY NOTES Abstract

Source URL: empslocal.ex.ac.uk

• Riemann hypothesis
• Riemann zeta function
• Functional equation
• Zeta
• Complex number
• Riemann sphere
• Dedekind zeta function
• Mathematical analysis
• Mathematics
• Analytic number theory

Lecture 1: Riemann, Dedekind, Selberg, and Ihara Zetas Audrey Terras U.C.S.D. 2008

Source URL: jessica2.msri.org

• Analytic number theory
• Riemann surfaces
• Conjectures
• Riemann hypothesis
• Riemann zeta function
• Zeta function
• Ihara zeta function
• Prime number theorem
• Möbius transformation
• Mathematical analysis
• Mathematics
• Geometry

Automorphic forms, L-functions and number theory (March 12–16) Three Introductory lectures E. Kowalski ´ Bordeaux I - A2X, 351, cours de la Libe ´ration, 33405 Talence

Source URL: www.math.ethz.ch

• Algebraic number theory
• Analytic number theory
• Conjectures
• Dirichlet L-function
• Functional equation
• Quadratic forms
• Dirichlet character
• Dedekind zeta function
• Riemann hypothesis
• Mathematical analysis
• Abstract algebra
• Mathematics

DEDEKIND ZETA MOTIVES FOR TOTALLY REAL NUMBER FIELDS FRANCIS C.S. BROWN Abstract. Let k be a totally real number field. For every odd n ≥ 3, we construct an element in the category MT(k) of mixed Tate motives over k

Source URL: www.ihes.fr

• Algebraic geometry
• Quadratic forms
• Geometric group theory
• Algebraic number theory
• Hyperbolic geometry
• Hyperbolic space
• Dedekind zeta function
• Motive
• Building
• Abstract algebra
• Algebra
• Mathematics

Algebraic K-theory of Number Fields

Source URL: www.algant.eu

• Mathematical analysis
• Field theory
• Meromorphic functions
• Analytic number theory
• Ring of integers
• Ring theory
• Riemann zeta function
• Algebraic number field
• Dedekind zeta function
• Abstract algebra
• Mathematics
• Algebraic number theory