Letteratura scientifica selezionata sul tema "Courses de nombre premiers"
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Articoli di riviste sul tema "Courses de nombre premiers":
BILLEREY, NICOLAS. "CRITÈRES D'IRRÉDUCTIBILITÉ POUR LES REPRÉSENTATIONS DES COURBES ELLIPTIQUES". International Journal of Number Theory 07, n. 04 (giugno 2011): 1001–32. http://dx.doi.org/10.1142/s1793042111004538.
BARREY, E. "Les objectifs et les critères de sélection : Evaluation de l’aptitude sportive chez le cheval : application à la définition de critères précoces de sélection". INRAE Productions Animales 5, HS (2 dicembre 1992): 167–73. http://dx.doi.org/10.20870/productions-animales.1992.5.hs.4281.
Fau, Victor, Dany Diep, Gérard Bader, Damien Brézulier e Olivier Sorel. "Efficacité des techniques de décortication alvéolaire sélective dans l’accélération du traitement orthodontique : une revue systématique de la littérature". L'Orthodontie Française 88, n. 2 (giugno 2017): 165–78. http://dx.doi.org/10.1051/orthodfr/2017005.
Duke, William. "Courbes elliptiques sur Q sans nombres premiers exceptionnels". Comptes Rendus de l'Académie des Sciences - Series I - Mathematics 325, n. 8 (ottobre 1997): 813–18. http://dx.doi.org/10.1016/s0764-4442(97)80118-8.
DE KONINCK, J. M., e G. TENENBAUM. "Sur la loi de répartition du k-ième facteur premier d'un entier". Mathematical Proceedings of the Cambridge Philosophical Society 133, n. 2 (settembre 2002): 191–204. http://dx.doi.org/10.1017/s0305004102005972.
Kraus, Alain. "Équation de Fermat et nombres premiers inertes". International Journal of Number Theory 11, n. 08 (5 novembre 2015): 2341–51. http://dx.doi.org/10.1142/s1793042115501079.
Le Gros, Gaïc, e Charles Merlin. "Les États-Unis s’engagent vers le déploiement des premiers SMR". Revue Générale Nucléaire, n. 1 (gennaio 2021): 44–49. http://dx.doi.org/10.1051/rgn/20211044.
Soares, Chelsea, Jason Hu, Kyle Kai Ho Ng e Fan Yang. "Pioneering International Collaboration in Medical Education: The Ottawa-Shanghai Joint School of Medicine (OSJSM) Student Builder Program (SBP)". University of Ottawa Journal of Medicine 6, n. 2 (30 novembre 2016): 49–54. http://dx.doi.org/10.18192/uojm.v6i2.1557.
Hanna GAUTIER. "Blocs de chiffres de taille croissante dans les nombre premiers". Bulletin de la Société mathématique de France 147, n. 4 (2019): 661–704. http://dx.doi.org/10.24033/bsmf.2795.
Lagrange, Hugues. "Le nombre de partenaires sexuels : les hommes en ont-ils plus que les femmes ?" Population Vol. 46, n. 2 (1 febbraio 1991): 249–77. http://dx.doi.org/10.3917/popu.p1991.46n2.0277.
Tesi sul tema "Courses de nombre premiers":
Sedrati, Youssef. "Courses de polynômes irréductibles dans les corps de fonctions". Electronic Thesis or Diss., Université de Lorraine, 2023. http://www.theses.fr/2023LORR0092.
For a very long time, many mathematicians have been fascinated by prime numbers. They have studied the properties of these numbers and have established many theorems concerning them. Among these results, we can mention the Fundamental Theorem of Arithmetic which states that any integer greater than 1 is uniquely written as a product of prime numbers. Thanks to this theorem, we can view the primes as the elementary bricks in the construction of positive integers. Prime numbers have many applications in various fields. For example, the RSA algorithm is used to secure credit cards. The power of this algorithm lies in the difficulty of factoring a number, which is a product of two very large primes. Prime numbers still hide several mysteries, and their distribution is still not very well understood. In 1853, Chebyshev observed a disparity in the distribution of prime numbers in arithmetic progressions. He noticed that for most real numbers x geq 2, there are more primes less than x of the form 4n+3 than of the form 4n+1.The goal of this thesis is to study a generalization of this phenomenon to races of primes in the context of the ring of polynomials over a finite field mathbb{F}_{q}, where q is a power of an odd prime. To do this, we shall begin by explaining the origin of Chebyshev's bias. We then focus on this phenomenon in function fields, in particular the works of Cha. Using Lamzouri's work concerning prime number races, we have been able to highlight the difference between races with two competitors and races with three or more competitors in the case of function fields. We will also give some examples of races in function fields where the associated densities vanish, which is not the case in number fields. In the last part of this thesis, we shall investigate the races of monic irreducible polynomials modulo a monic polynomial m when the number of competitors r tends to +infty with the degree of m
Morain, François. "Courbes elliptiques et tests de primalité". Lyon 1, 1990. http://www.theses.fr/1990LYO10170.
Ezome, Mintsa Tony Mack Robert. "Courbes elliptiques, cyclotomie et primalité". Toulouse 3, 2010. http://thesesups.ups-tlse.fr/825/.
Information is very precious, this is the reason why it must be protected both in databasis and during transmission. Integer factoring is a diffcult problem and a cornerstone for safety in asymmetric cryptography. Thus it is very important to be able to check for the primality of big integers for asymetric cryptography. To do this we use primality tests. The AKS test is a deterministic polynomial time primality proving algorithm proposed by Agrawal, Kayal and Saxena in August 2002 ('Primes is in P'). The Elliptic Curves Primality Proving (ECPP), proposed by A. O. L. Atkin in 1988, is a probabilistic test. It is one of the most powerful primality tests that is used in practice. The purpose of this thesis is to give an elliptic version of the AKS primality criterion involving a ring of elliptic periods. Such a ring is obtained as a residue ring at a torsion section on an elliptic curve defined on Z/nZ. This section plays the role of the root of unity in the original AKS test. We give a general criterion in terms of etale extensions of Z/nZ equipped with an automorphism, and we show how to build such extensions using isogenies between elliptic curves modulo n
Bailleul, Alexandre. "Étude de la répartition des automorphismes de Frobenius dans les groupes de Galois". Thesis, Bordeaux, 2020. http://www.theses.fr/2020BORD0203.
In this thesis, we are interested in multiple aspects of the theory of prime number races, initiated by Rubinstein and Sarnak in 1994. In the first chapter, we explain Rubinstein and Sarnak's method, we give an overview of extensions of their work, and we develop their method in a general setting, with the goal of weakening as much as possible their working hypothesis about the linear independence of the imaginary parts of non-trivial zeros of Dirichlet L-functions. In the second chapter, we are interested in the generalisation of problems of prime number races in the context of the distribution of Frobenius automorphisms in Galois groups of number field extensions. Following recent work of Fiorilli and Jouve, we highlight the influence that the vanishing at 1/2 of some Artin L-functions can have on such races. In the third and final chapter, we are interested in the same kind of questions as before in the context of extensions of function fields in one variable over finite fields, and we prove a new central limit theorem for superelliptic extensions
Dusart, Pierre. "Autour de la fonction qui compte le nombre de nombres premiers". Limoges, 1998. http://www.theses.fr/1998LIMO0007.
Azzouza, Nour-Eddine. "Majorations effectives du nombre d'entiers inferieurs a x, et ayant exactement k facteurs premiers". Limoges, 1988. http://www.theses.fr/1988LIMO0032.
Azzouza, Nour-Eddine. "Majorations effectives du nombre d'entiers inférieurs à X, et ayant exactement K facteurs premiers". Grenoble 2 : ANRT, 1988. http://catalogue.bnf.fr/ark:/12148/cb37611454v.
Sedunova, Alisa. "Points sur les courbes algébriques sur les corps de fonctions, les nombres premiers dans les progressions arithmétiques : au-delà des théorèmes de Bombieri-Pila et de Bombieri-Vinogradov". Thesis, Université Paris-Saclay (ComUE), 2017. http://www.theses.fr/2017SACLS178/document.
E.Bombieri and J.Pila introduced a method to bound the number of integral points in a small given box (under some conditions). In algebraic part we generalise this method to the case of function fields of genus $0$ in ove variable. Then we apply the result to count the number of elliptic curves falling in the same isomorphic class with coefficients lying in a small box.Once we are done the natural question is how to improve this bound for some particular families of curves. We study the case of elliptic curves and use the fact that the necessary part of Birch Swinnerton-Dyer conjecture holds over function fields. We also use the properties of height functions and results about sphere packing.In analytic part we give an explicit version of Bombieri-Vinogradov theorem. This theorem is an important result that concerns the error term in Dirichlet's theorem in arithmetic progressions averaged over moduli $q$ up to $Q$. We improve the existent result of such type given in cite{Akbary2015}. We reduce the logarithmic power by using the large sieve inequality and Vaughan identity
Moreira, Nunes Ramon. "Problèmes d’équirépartition des entiers sans facteur carré". Thesis, Paris 11, 2015. http://www.theses.fr/2015PA112123/document.
This thesis concerns a few problems linked with the distribution of squarefree integers in arithmeticprogressions. Such problems are usually phrased in terms of upper bounds for the error term relatedto this distribution.The first, second and fourth chapter focus on the satistical study of the error terms as the progres-sions varies modulo q. In particular we obtain an asymptotic formula for the variance and non-trivialupper bounds for the higher moments. We make use of many technics from analytic number theorysuch as sieve methods and exponential sums. In particular, in the second chapter we make use of arecent upper bound for short exponential sums by Bourgain.In the third chapter we give estimates for the error term for a fixed arithmetic progression. Weimprove on a result of Hooley from 1975 in two different directions. Here we use recent upper boundsfor short exponential sums by Bourgain-Garaev and exponential sums twisted by the Möbius functionby Bourgain et Fouvry-Kowalski-Michel
Goudout, Elie. "Étude de la fonction ω : petits intervalles et systèmes translatés". Thesis, Sorbonne Paris Cité, 2019. http://www.theses.fr/2019USPCC040.
In this thesis, we study the interactions between the multiplicative and additive structures of integers. As such, we particularly investigate the function “number of distinct prime factors”, noted ω, on short intervals and shifted systems. This project originates from an important breakthrough of Matomäki & Radziwiłł regarding the study of small intervals, in 2015. As a first step, we show that the Erdős-Kac theorem is valid in almost all short intervals, as long as their length goes to infinity. We then consider the local laws of ω. We prove that, for x> 3 and , almost all intervals of length h contain integers n 6 x satisfying ω(n) = k, when h is large enough. For , the condition on h is optimal. A similar result, albeit non optimal, is obtained for x1/u-friable integers with u 6 (logx)1/6−ε, where ε > 0 is fixed, arbitrarily small. The techniques used in the second chapter naturally invite us to consider the behavior of a wide class of additive functions on shifted systems. In the third chapter, we prove a multidimensional version of a theorem from Halász in 1975, regarding the maximum concentration of the values of one additive function. In the last chapter, we show that ω(n− 1) satisfies an Erdős-Kac theorem whenever ω(n) = k is fixed. This generalizes a theorem of Halberstam
Libri sul tema "Courses de nombre premiers":
Tenenbaum, Gerald. Les nombres premiers: Entre l'ordre et le chaos. Paris: Dunod, 2011.
Decorps, Gérard, Jean-François Hagenmuller e Christophe Moulin. Alpinisme des premiers pas aux grandes courses. Glénat, 1998.
Barton, Chrissy K. 300+ Mes Premiers Mots en Français. Premiers Éléments de Vocabulaire de Base en Français Pendjabi: Mots de Base Dictionnaire Visuel Junior. Apprendre a Lire Livre Pour développer le Vocabulaire Pour Bébé - Couleurs, Animaux, Formes, Nombre, Etc. Independently Published, 2021.
Barton, Chrissy K. 300+ Mes Premiers Mots en Français. Premiers Éléments de Vocabulaire de Base en Français Suédois: Mots de Base Dictionnaire Visuel Junior. Apprendre a Lire Livre Pour développer le Vocabulaire Pour Bébé - Couleurs, Animaux, Formes, Nombre, Etc. Independently Published, 2021.
Daguerre, Blandine. Passage et écriture de l’entre-deux dans El Pasajero de Cristóbal Suárez de Figueroa. Presses Universitaires de Pau et des Pays de l'Adour, 2020. http://dx.doi.org/10.46608/primaluna3.9782353111220.
Breton, Gilles, Jean-Paul Laurens e David Bel, a cura di. L’internationalisation différenciée des universités - Points de vue d’acteurs. Editions des archives contemporaines, 2020. http://dx.doi.org/10.17184/eac.9782813003461.
Mangeot, Mathieu, e Agnès Tutin, a cura di. Lexique(s) et genre(s) textuel(s) : approches sur corpus. Editions des archives contemporaines, 2020. http://dx.doi.org/10.17184/eac.9782813003454.
Capitoli di libri sul tema "Courses de nombre premiers":
Balazard, Michel. "Comportement Statistique du Nombre de Facteurs Premiers des Entriers". In Progress in Mathematics, 1–21. Boston, MA: Birkhäuser Boston, 1990. http://dx.doi.org/10.1007/978-1-4612-3460-9_1.
Balazard, Michel. "Comportement Statistique du Nombre de Facteurs Premiers des Entiers". In Progress in Mathematics, 1–21. Boston, MA: Birkhäuser Boston, 1990. http://dx.doi.org/10.1007/978-1-4612-5788-2_1.
Roffet-Salque, Mélanie, Pascale Gerbault e Rosalind E. Gillis. "Une histoire de l’exploitation laitière : approches génétique, archéozoologique et biomoléculaire". In Regards croisés: quand les sciences archéologiques rencontrent l'innovation, 1–24. Editions des archives contemporaines, 2017. http://dx.doi.org/10.17184/eac.3788.
TOLLU, I., K. KEARNS e P. BENNER. "Première transfusion sanguine précoce de globules rouges dans un avion d'évacuation médicale tactique". In Médecine et Armées Vol. 46 No.2, 125–30. Editions des archives contemporaines, 2018. http://dx.doi.org/10.17184/eac.7352.
ALGMI, Nadjah, e Jean-Paul MEREAUX. "Une grille de lecture des défaillances d’entreprises versus réalité du Covid-19". In Les épidémies au prisme des SHS, 167–74. Editions des archives contemporaines, 2022. http://dx.doi.org/10.17184/eac.6002.
Van Dijk, Suzan. "Partager et faire connaître l’héritage littéraire féminin". In Le Crowdsourcing, 185–96. Editions des archives contemporaines, 2021. http://dx.doi.org/10.17184/eac.3918.
Myers, Marie J. "Viser une production optimale". In L'enseignement de l'oral en classe de langue, 15–28. Editions des archives contemporaines, 2020. http://dx.doi.org/10.17184/eac.3491.
ABAKA, Kouassi Gérard. "Des représentations du nouchi et des attitudes envers son usage en milieu familial". In L’expansion de la norme endogène du français en francophonie, 107–22. Editions des archives contemporaines, 2023. http://dx.doi.org/10.17184/eac.7122.
DELBARRE, M., e F. FROUSSART-MAILLE. "Le blessé oculaire balistique". In Médecine et Armées Vol. 46 No.5, 439–46. Editions des archives contemporaines, 2018. http://dx.doi.org/10.17184/eac.7314.
BERGER, F., S. WATIER, C. FICKO, M. L. PONSARD, P. GAUTRET, D. RINGOT e J. P. DEMONCHEAUX. "Expositions au virus rabique dans les armées françaises". In Médecine et Armées Vol. 46 No.1, 53–62. Editions des archives contemporaines, 2018. http://dx.doi.org/10.17184/eac.7369.
Atti di convegni sul tema "Courses de nombre premiers":
Ferre, F. "Des greffes autologues aux cellules souches, quel avenir pour la chirurgie pré-implantaire ?" In 66ème Congrès de la SFCO. Les Ulis, France: EDP Sciences, 2020. http://dx.doi.org/10.1051/sfco/20206601005.
Pajot, T., S. Ketoff e L. Bénichou. "Chirurgie implantaire guidée : acquisition, planification, modélisation et production d'un guide chirurgical. Mise en place d'une chaine numérique pour la création interne et l'utilisation de guides chirurgicaux". In 66ème Congrès de la SFCO. Les Ulis, France: EDP Sciences, 2020. http://dx.doi.org/10.1051/sfco/20206602006.
Castillo Fuentealba, Carlos Ignacio, e Gabriel Gatica-Gómez. "Lo uno, y también lo otro: contenedor preciso, programa alterno". In Jornadas sobre Innovación Docente en Arquitectura. Grup per a la Innovació i la Logística Docent en l'Arquitectura (GILDA), 2023. http://dx.doi.org/10.5821/jida.2023.12318.
Rapporti di organizzazioni sul tema "Courses de nombre premiers":
Dufour, Quentin, David Pontille e Didier Torny. Contracter à l’heure de la publication en accès ouvert. Une analyse systématique des accords transformants. Ministère de l'enseignement supérieur et de la recherche, aprile 2021. http://dx.doi.org/10.52949/2.
Gestion de la pandémie de COVID-19 - Analyse de la dotation en personnel dans les centres d'hébergement de soins de longue durée du Québec au cours de la première vague. CIRANO, giugno 2023. http://dx.doi.org/10.54932/fupo1664.