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A note on moments of $ζ^{'} (1 / 2 + i γ)$ .

Laurinčikas, Antanas; Steuding, Jörn — 2004

Publications de l'Institut Mathématique. Nouvelle Série

Simpson's paradox in the Farey sequence.

Šleževičienė-Steuding, Rasa; Steuding, Jörn — 2006

Integers

Extremal values of Dirichlet $L$ -functions in the half-plane of absolute convergence

Jörn Steuding — 2004

Journal de Théorie des Nombres de Bordeaux

We prove that for any real $θ$ there are infinitely many values of $s = σ + i t$ with $σ \to 1 +$ and $t \to + \infty$ such that $ℜ {exp (i θ) log L (s, χ)} \geq log \frac{log log log t}{log log log log t} + O (1) .$ The proof relies on an effective version of Kronecker’s approximation theorem.

Upper bounds for the density of universality

Jörn Steuding — 2003

Acta Arithmetica

On the value-distribution of Epstein zeta-functions.

Jörn Steuding — 2007

Publicacions Matemàtiques

We investigate the value-distribution of Epstein zeta-functions ζ(s; Q), where Q is a positive definite quadratic form in n variables. We prove an asymptotic formula for the number of c-values, i.e., the roots of the equation ζ(s; Q) = c, where c is any fixed complex number. Moreover, we show that, in general, these c-values are asymmetrically distributed with respect to the critical line Re s =n/4. This complements previous results on the zero-distribution. [Proceedings...

Ergodic Universality Theorems for the Riemann Zeta-Function and other $L$ -Functions

Jörn Steuding — 2013

Journal de Théorie des Nombres de Bordeaux

We prove a new type of universality theorem for the Riemann zeta-function and other $L$ -functions (which are universal in the sense of Voronin’s theorem). In contrast to previous universality theorems for the zeta-function or its various generalizations, here the approximating shifts are taken from the orbit of an ergodic transformation on the real line.

Upper bounds for the density of universality. II

Jörn Steuding — 2005

Acta Mathematica Universitatis Ostraviensis

We prove explicit upper bounds for the density of universality for Dirichlet series. This complements previous results [15]. Further, we discuss the same topic in the context of discrete universality. As an application we sharpen and generalize an estimate of Reich concerning small values of Dirichlet series on arithmetic progressions in the particular case of the Riemann zeta-function.

Limit theorems in the space of analytic functions for the Hurwitz zeta-function with an algebraic irrational parameter

Antanas Laurinčikas; Jörn Steuding — 2011

Open Mathematics

We prove a limit theorem in the space of analytic functions for the Hurwitz zeta-function with algebraic irrational parameter.

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Currently displaying 1 – 12 of 12

A note on moments of $ζ^{'} (1 / 2 + i γ)$ .

Simpson's paradox in the Farey sequence.

Extremal values of Dirichlet $L$ -functions in the half-plane of absolute convergence

Upper bounds for the density of universality

On the value-distribution of Epstein zeta-functions.

Ergodic Universality Theorems for the Riemann Zeta-Function and other $L$ -Functions

Upper bounds for the density of universality. II

Limit theorems in the space of analytic functions for the Hurwitz zeta-function with an algebraic irrational parameter

Erratum: "On the number of prime divisors of the order of elliptic curves modulo p" (Acta Arith. 117 (2005), 341-352)

On the number of prime divisors of the order of elliptic curves modulo p

A Note on Moments of Zeta'(1/2+i Gamma)

Kettenbrüche als Summen ebensolcher