EuDML | Browse

The search session has expired. Please query the service again.

Items

All a b c d e f g h i j k l m n o p q r s t u v w x y z Other

Page 1 Next

Displaying 1 – 20 of 24

Second order modular forms

G. Chinta, N. Diamantis (2002)

Acta Arithmetica

S-extremal strongly modular lattices

Gabriele Nebe, Kristina Schindelar (2007)

Journal de Théorie des Nombres de Bordeaux

S-extremal strongly modular lattices maximize the minimum of the lattice and its shadow simultaneously. They are a direct generalization of the s-extremal unimodular lattices defined in [6]. If the minimum of the lattice is even, then the dimension of an s-extremal lattices can be bounded by the theory of modular forms. This shows that such lattices are also extremal and that there are only finitely many s-extremal strongly modular lattices of even minimum.

Shintani and Shimura lifts of cusp forms on certain arithmetic groups and their applications

SoYoung Choi, Chang Heon Kim (2017)

Open Mathematics

For an odd and squarefree level N, Kohnen proved that there is a canonically defined subspace [...] S κ + 1 2 n e w ( N ) ⊂ S κ + 1 2 ( N ) , and S κ + 1 2 n e w ( N ) and S 2 k n e w ( N ) $S_{κ + \frac{1}{2}}^{n e w} (N) \subset S_{κ + \frac{1}{2}} (N), and S_{κ + \frac{1}{2}}^{n e w} (N) and S_{2 k}^{n e w} (N)$ are isomorphic as modules over the Hecke algebra. Later he gave a formula for the product [...] a g ( m ) a g ( n ) ¯ $a_{g} (m) \bar{a_{g} (n)}$ of two arbitrary Fourier coefficients of a Hecke eigenform g of halfintegral weight and of level 4N in terms of certain cycle integrals of the corresponding form f of integral weight. To this...

Simple zeros of degree 2 $L$ -functions

Andrew R. Booker (2016)

Journal of the European Mathematical Society

We prove that the complete $L$ -functions of classical holomorphic newforms have infinitely many simple zeros.

Small eigenvalues of Laplacian for $Γ_{0} (N)$

Henryk Iwaniec (1990)

Acta Arithmetica

Solving diophantine equations $x^{4} + y^{4} = q z^{p}$

Luis V. Dieulefait (2005)

Acta Arithmetica

Solving Ramanujan's differential equations for Eisenstein series via a first order Riccati equation

James M. Hill, Bruce C. Berndt, Tim Huber (2007)

Acta Arithmetica

Some computations with Hecke rings and deformation rings. With an appendix by Amod Agashe and William Stein.

Lario, Joan-C., Schoof, René (2002)

Experimental Mathematics

Some eta-identities arising from theta series.

Günter Köhler (1990)

Mathematica Scandinavica

Some relations between the analytical modular forms and Maass waveforms for $PSL (2, ℤ)$

А.Б. Венков (1992)

Zapiski naucnych seminarov POMI

Some Remarks on Odd Maass Wave Forms (and a Correction to [1]).

James Lee Hafner (1987)

Mathematische Zeitschrift

Some results on algebraic independence. (Quelques résultats d'indépendance algébrique.)

Gramain, François (1998)

Documenta Mathematica

Special values of the standard zeta functions for elliptic modular forms.

Katsurada, Hidenori (2005)

Experimental Mathematics

Stickelberger elements and modular parametrizations of elliptic curves.

Glenn Stevens (1989)

Inventiones mathematicae

Sums Involving the Values at Negative Integers of L-Functions of Quadratic Characters.

Henri Cohen (1975)

Mathematische Annalen

Sums of Powers of Cusp Form Coefficients.

R.A. Rankin (1983)

Mathematische Annalen

Sums of Powers of Cusp Form Coefficients. II.

R. A. Rankin (1985)

Mathematische Annalen

Superelliptic equations arising from sums of consecutive powers

Michael A. Bennett, Vandita Patel, Samir Siksek (2016)

Acta Arithmetica

Using only elementary arguments, Cassels solved the Diophantine equation (x-1)³ + x³ + (x+1)³ = z² (with x, z ∈ ℤ). The generalization ${(x - 1)}^{k} + x^{k} + {(x + 1)}^{k} = z^{n}$ (with x, z, n ∈ ℤ and n ≥ 2) was considered by Zhongfeng Zhang who solved it for k ∈ 2,3,4 using Frey-Hellegouarch curves and their corresponding Galois representations. In this paper, by employing some sophisticated refinements of this approach, we show that the only solutions for k = 5 have x = z = 0, and that there are no solutions for k = 6. The chief innovation...

Sur la multiplication complexe des fonctions elliptiques

Sylow (1887)

Journal de Mathématiques Pures et Appliquées

Sur la nature arithmétique des valeurs de fonctions modulaires

Michel Waldschmidt (1996/1997)

Séminaire Bourbaki

Currently displaying 1 – 20 of 24

Page 1 Next