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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 of the Primeras Jornadas...

On the Weil-Siegel formula.

Stephen S. Kudla, Stephen Rallis (1988)

Journal für die reine und angewandte Mathematik

On the Weil-Siegel formula II.

Stephen Rallis, St.S. Kudla (1988)

Journal für die reine und angewandte Mathematik

On theta series vanishing at ∞ and related lattices

Christine Bachoc, Riccardo Salvati Manni (2006)

Acta Arithmetica

Primitive lattice points inside an ellipse

Werner Georg Nowak (2005)

Czechoslovak Mathematical Journal

Let $Q (u, v)$ be a positive definite binary quadratic form with arbitrary real coefficients. For large real $x$ , one may ask for the number $B (x)$ of primitive lattice points (integer points $(m, n)$ with $gcd (M, n) = 1$ ) in the ellipse disc $Q (u, v) \leq x$ , in particular, for the remainder term $R (x)$ in the asymptotics for $B (x)$ . While upper bounds for $R (x)$ depend on zero-free regions of the zeta-function, and thus, in most published results, on the Riemann Hypothesis, the present paper deals with a lower estimate. It is proved that the absolute value or...

Quotients of Theta Series as Rational Functions of J and ?.

Ja Kyung Koo (1989)

Mathematische Zeitschrift

Rationality of a certain formal power series attached to local densities of quadratic forms.

Hidenori Katsurada (1994)

Manuscripta mathematica

Real Zeros of Eisenstein Series.

Jeffrey Hoffstein (1982)

Mathematische Zeitschrift

Représentations des algèbres de rang 2 et fonctions zêta associées

Dehbia Achab (1995)

Annales de l'institut Fourier

Dans un travail précédent nous avons défini et étudié la fonction zêta associée à une représentation d’une algèbre de Jordan euclidienne déployée et à un réseau dans l’espace de la représentation. Nous avons démontré la convergence dans un demi-plan, établi l’existence d’un prolongement méromorphe et d’une équation fonctionnelle scalaire. Cette fonction est une généralisation de la fonction zêta de Koecher; elle est donnée dans son domaine de convergence, par une série qui somme sur certains éléments...

Séries thêta des formes quadratiques indéfinies

Marie-France Vignéras (1975/1976)

Séminaire Delange-Pisot-Poitou. Théorie des nombres

Special values of multiple gamma functions

William Duke, Özlem Imamoḡlu (2006)

Journal de Théorie des Nombres de Bordeaux

We give a Chowla-Selberg type formula that connects a generalization of the eta-function to $GL (n)$ with multiple gamma functions. We also present some simple infinite product identities for certain special values of the multiple gamma function.

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Displaying 41 – 60 of 114

On the number of representations of integers by quadratic forms in twelve variables.

On the number of representations of positive integers by quadratic forms as the basis of the space $S_{4} (Γ_{0} (47), 1)$ .

On the Poles of Andranov L-Functions.

On the representation of numbers by the direct sums of some quaternary quadratic forms.

On the representation of the integer by positive quadratic forms with square-free variables

On the Shintani zeta function for the space of binary quadratic forms.

On the value-distribution of Epstein zeta-functions.