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Krir, Mohamed

Author ID: krir.mohamed Recent zbMATH articles by "Krir, Mohamed"
Published as: Krir, Mohamed
External Links: MGP
Documents Indexed: 7 Publications since 1993

Co-Authors

7 single-authored

Serials

2 Comptes Rendus de l’Académie des Sciences. Série I
1 Acta Arithmetica
1 Annales de l’Institut Fourier
1 Manuscripta Mathematica
1 Journal de Théorie des Nombres de Bordeaux

Fields

5 Number theory (11-XX)
4 Algebraic geometry (14-XX)
1 Combinatorics (05-XX)

Publications by Year

all cited Publications top 5 cited Publications

Citations contained in zbMATH Open

4 Publications have been cited 10 times in 10 Documents Cited by Year
On Lang’s conjecture on the lower bound of the Néron-Tate height for elliptic curves over \(\mathbb Q\). (À propos de la conjecture de Lang sur la minoration de la hauteur de Néron-Tate pour les courbes elliptiques sur \(\mathbb Q\).) Zbl 0981.11021
Krir, Mohamed
6
2001
Degree of an extension of \(\mathbb{Q}_ p^{\text{nr}}\) on which \(J_ 0 (N)\) is semi-stable. (Degré d’une extension de \(\mathbb{Q}_ p^{\text{nr}}\) sur laquelle \(J_ 0(N)\) est semi-stable.) Zbl 0853.11042
Krir, Mohamed
2
1996
An extension of \(\mathbb{Q}_ p^{nr}\) on which \(J_ 0(N)\) is semi-stable. (Une extension de \(\mathbb{Q}_ p^{nr}\) sur laquelle \(J_ 0(N)\) est semi- stable.) Zbl 0799.14008
Krir, Mohamed
1
1993
An effective version of a theorem of Waldspurger. (Une version effective d’un théorème de Waldspurger.) Zbl 0808.11029
Krir, Mohamed
1
1993
On Lang’s conjecture on the lower bound of the Néron-Tate height for elliptic curves over \(\mathbb Q\). (À propos de la conjecture de Lang sur la minoration de la hauteur de Néron-Tate pour les courbes elliptiques sur \(\mathbb Q\).) Zbl 0981.11021
Krir, Mohamed
6
2001
Degree of an extension of \(\mathbb{Q}_ p^{\text{nr}}\) on which \(J_ 0 (N)\) is semi-stable. (Degré d’une extension de \(\mathbb{Q}_ p^{\text{nr}}\) sur laquelle \(J_ 0(N)\) est semi-stable.) Zbl 0853.11042
Krir, Mohamed
2
1996
An extension of \(\mathbb{Q}_ p^{nr}\) on which \(J_ 0(N)\) is semi-stable. (Une extension de \(\mathbb{Q}_ p^{nr}\) sur laquelle \(J_ 0(N)\) est semi- stable.) Zbl 0799.14008
Krir, Mohamed
1
1993
An effective version of a theorem of Waldspurger. (Une version effective d’un théorème de Waldspurger.) Zbl 0808.11029
Krir, Mohamed
1
1993
all cited Publications top 5 cited Publications
all top 5

Cited by 12 Authors

2 Krir, Mohamed
2 Pazuki, Fabien
1 Delaunay, Christophe
1 Fujita, Yasutsugu
1 Lehr, Claus-Michael
1 Lorenzini, Dino J.
1 Matignon, Michel
1 Petit, Valentin
1 Roblot, Xavier-François
1 Terai, Nobuhiro
1 Voutier, Paul M.
1 Yabuta, Minoru
all top 5

Cited in 7 Serials

4 Journal de Théorie des Nombres de Bordeaux
1 Acta Arithmetica
1 Annales de l’Institut Fourier
1 Duke Mathematical Journal
1 Manuscripta Mathematica
1 European Journal of Mathematics
1 Research in Number Theory

Cited in 2 Fields

10 Number theory (11-XX)
5 Algebraic geometry (14-XX)

Citations by Year