Sur la conjecture de Manin pour certaines surfaces de Châtelet

Bretèche, Régis de la; Tenenbaum, Gérald

doi:10.1017/s1474748012000886

Cited by 18 publications

(42 citation statements)

References 27 publications

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“…On peut alors constater qu'un changement de variables u = Ez (voir [5, section 6]) fait apparaître l'inverse de det(E) et ainsi, on peut intégrer plutôt sur la forme J définie par J(z) = F 3 (Ez) (voir [8]) et obtenir par exemple la majoration…”

Section: 3unclassified

“…D'après [15] et [16], l'obstruction de Brauer-Manin est la seule obstruction au principe de Hasse età l'approximation faible pour les surfaces de Châtelet et en particulier les surfaces considérées spécifiquement dans cet article ne satisfont pas nécessairement l'approximation faible mais satisfont le principe de Hasse. Il s'agit ici du troisième cas, après [7] et [8], pour lequel la conjecture de Manin dans sa forme forte conjecturée par Peyre dans [31, formule 5.1] estétablie par des méthodes de descente sur des torseurs pour une classe de variétés ne satisfaisant pas l'approximation faible.…”

Section: Introductionunclassified

“…Les travaux de La Bretèche, Browning et Peyre [7] utilisant l'approche par les torseurs versels (introduits par Colliot-Thélène et Sansuc dans [12], [13] et [14] et utilisés dans ce cadre pour la première fois par Salberger dans [34]) ont permis dans un premier temps d'établir la conjecture de Manin dans le cas de factorisations de type un produit de formes linéaires non proportionnelles [7], puis les travaux de La Bretèche et Browning [8].…”

Section: Introductionunclassified

“…Le théorème suivant améliore notamment la borne N(B) ≪ B log(B) obtenue par Browning dans [9]. Remarque: On peut se convaincre assez aisément que les méthodes développées ici permettraient de généraliser le résultatà tous les a < 0 mais au prix d'un certain nombre de complications techniques comme expliqué dans [8,Introduction]. Le cas a > 0 semble nécessiter une approche différente du fait du nombre infini d'unités du corps quadratique réel Q ( √ a).…”

Section: Introductionunclassified

“…On rappelle qu'on a l'expression r(n) = 4 d|n χ(d), où χ désigne le caractère de Dirichlet non principal modulo 4. La méthode pour estimer ces sommes est inspirée de l'article [5] où le même genre de sommes estétudiée mais pour la fonction τ nombre de diviseursà la place de la fonction r. Pour la vérification de la conjecture de Peyre, on s'inspire ici de [8] et de [7]. Cependant,à la différence du cas traité dans [7], onétablit que le traitement de la conjecture de Manin se fait au moyen d'un passage sur des torseurs distincts des torseurs versels dont on donne une description précise en section 7.…”

Section: Introductionunclassified

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La conjecture de Manin pour certaines surfaces de Châtelet

Destagnol¹

2016

Acta Arith.

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Abstract. -Following the line of attack from La Bretèche, Browning and Peyre, we prove Manin's conjecture in its strong form conjectured by Peyre for a family of Châtelet surfaces which are defined as minimal proper smooth models of affine surfaces of the form,] is a polynomial of degree 4 whose factorisation into irreducibles contains two non proportional linear factors and a quadratic factor which is irreducible over. This result deals with the last remaining case of Manin's conjecture for Châtelet surfaces with a = −1 and essentially settles Manin's conjecture for Châtelet surfaces with a < 0.

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Section: 3unclassified

Section: Introductionunclassified

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La conjecture de Manin pour certaines surfaces de Châtelet

Destagnol¹

2016

Acta Arith.

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Some of Erdős’ Unconventional Problems in Number Theory, Thirty-four Years Later

Tenenbaum¹

2013

Bolyai Society Mathematical Studies

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There are many ways to recall Paul Erdős' memory and his special way of doing mathematics. Ernst Straus described him as "the prince of problem solvers and the absolute monarch of problem posers". Indeed, those mathematicians who are old enough to have attended some of his lectures will remember that, after his talks, chairmen used to slightly depart from standard conduct, not asking if there were any questions but if there were any answers.In the address that he forwarded to Miklós Simonovits for Erdős' funeral, Claude Berge mentions a conversation he had with Paul in the gardens of the Luminy Campus, near Marseilles, in September 1995. After Paul's opening lecture for this symposium on Combinatorics, Berge asked him to specify his beauty criteria for a conjecture in discrete mathematics. Erdős mainly retained the following five:(i) The simplicity of the statement;(ii) The expected difficulty of the solution (which Paul liked to measure in dollars); (iii) The posterity of the subsequent theorem, i.e. the set of results arising either directly from the solution of from the methods designed to obtain it;(iv) The future of the path opened by the problem, which I would rather call the set of descendants of the problem, in other words the family of new questions opened up by the statement or the solution of the conjecture;(v) The intuitive representability of the specific mathematical property that is being dealt with. Apart, perhaps, the last, for which an adequate transposition should be described with further precision, these criteria are equally relevant to a classification for a conjecture in analytic and/or elementary number theory.My purpose here mainly consists in illustrating these criteria by revisiting some of the problems stated by Erdős in his profound article [24].Aside from updating the status of a number of interesting questions, my hope is to convince the reader that Erdős' conjectures, although stated in a condensed and seemingly particular form, were problematics rather than problems. Day after day, year after year, each of his questions appears, in the light of discussions and partial progress, as a node in a gigantic net, designed not for a single prey but for a whole species.In the sequel of this paper, quotes from the article [24] are set in italics. I took liberties to correct obvious typographic errors and to slightly modify some notations in order to fit with subsequent works. Erdős' paper starts with the following.First of all I state a very old conjecture of mine: the density of integers n which have two divisors d 1 and d 2 satisfying d 1 < d 2 < 2d 1 is 1. I proved long ago [20] that the density of * We include here some corrections with respect to the published version.1. We shall make use of this extra information later on. 2. See [29] for a short proof.

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