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71	Diophantine Equations Involving Arithmetic Functions of Factorials Baczkowski, Daniel M. 12 July 2004 (has links) No description available. Mathematics math mathematics factorial arithmetic diophantine n! m!
72	Diophantine Equations and Cyclotomic Fields Bartolomé, Boris 26 November 2015 (has links) No description available. 510 Diophantine Equations Cyclotomic Fields Nagell-Ljunggren Equation Skolem Abouzaid Exponential Diophantine Equation Baker’s Inequality Subspace Theorem Mathematics (PPN61756535X)
73	Sur le spectre des exposants d'approximation diophantienne classiques et pondérés / On the spectrum of classical and twisted exponents of diophantine approximation Marnat, Antoine 24 November 2015 (has links) Pour un n-uplet de nombres réels, vu comme un point de l'espace projectif, on définit pour chaqueindice d entre 0 et n-1 deux exposants d'approximation diophantienne (un ordinaire et un uniforme)qui mesurent l'approximabilité de celui-ci par des sous-espaces rationnels de dimension d dansl'espace projectif. Il se trouve que ces 2n exposants ne sont pas indépendants les uns des autres.Cette thèse s'inscrit dans l'étude du spectre de tout ou partie de ces exposants, qui a fait l'objet denombreux travaux récents. On utilise notamment les outils récents de la géométrie paramétriquedes nombres pour étudier le spectre des exposants uniforme, et on traite un cas pondéré endimension 2. / Given a n-tuple of real numbers, seen as a point in the projective space, one can define for eachindex d between 0 and n-1 two exponents of diophantine approximation (an ordinary and auniform) which measure the approximability of this n-tuple by rational subspaces of dimension d inthe projective space. These 2n exponents are not independant. This thesis is part of the study fromthe spectrum of all or part of these exponents, which have been much studied recently. We userecent tools coming from the parametric geometry of numbers to study the spectrum of the uniformexponents, and deal with a twisted case in dimension two. Géométrie paramétrique des nombres Approximations diophantiennes Diophantine approximations Parametric geometry of numbers Spectrum of diophantine exponents 512.7 516
74	Approximation diophantienne sur les variétés projectives et les groupes algébriques commutatifs / Diophantine approximation on projective varieties and on commutative algebraic groups Ballaÿ, François 25 October 2017 (has links) Dans cette thèse, nous appliquons des outils issus de la théorie d’Arakelov à l’étude de problèmes de géométrie diophantienne. Une notion centrale dans notre étude est la théorie des pentes des fibrés vectoriels hermitiens, introduite par Bost dans les années 90. Nous travaillons plus précisément avec sa généralisation dans le cadre adélique, inspirée par Zhang et développée par Gaudron. Ce mémoire s’articule autour de deux axes principaux. Le premier consiste en l’étude d’un remarquable théorème de géométrie diophantienne dû à Faltings etWüstholz, qui généralise le théorème du sous-espace de Schmidt. Nous commencerons par retranscrire la démonstration de Faltings et Wüstholz dans le langage de la théorie des pentes. Dans un second temps, nous établirons des variantes effectives de ce théorème, que nous appliquerons pour démontrer une généralisation effective du théorème de Liouville valable pour les points fermés d’une variété projective fixée. Ce résultat fournit en particulier une majoration explicite de la hauteur des points satisfaisant une inégalité analogue à celle du théorème de Liouville classique. Dans la seconde partie de cette thèse, nous établirons de nouvelles mesures d’indépendance linéaire de logarithmes dans un groupe algébrique commutatif, dans le cas dit rationnel.Notre approche utilise les arguments de la méthode de Baker revisitée par Philippon et Waldschmidt, combinés avec des outils de la théorie des pentes. Nous y intégrons un nouvel argument, inspiré par des travaux antérieurs de Bertrand et Philippon, nous permettant de contourner les difficultés introduites par le cas périodique. Cette approche évite le recours à une extrapolation sur les dérivations à la manière de Philippon et Waldschmidt. Nous parvenons ainsi à supprimer une hypothèse technique contraignante dans plusieurs théorèmes de Gaudron, tout en précisant les mesures obtenues. / In this thesis, we study diophantine geometry problems on projective varieties and commutative algebraic groups, by means of tools from Arakelov theory. A central notion in this work is the slope theory for hermitian vector bundles, introduced by Bost in the 1990s. More precisely, we work with its generalization in an adelic setting, inspired by Zhang and developed by Gaudron. This dissertation contains two major lines. The first one is devoted to the study of a remarkable theorem due to Faltings and Wüstholz, which generalizes Schmidt’s subspace theorem. We first reformulate the proof of Faltings and Wüstholz using the formalism of adelic vector bundles and the adelic slope method. We then establish some effective variants of the theorem, and we deduce an effective generalization of Liouville’s theorem for closed points on a projective variety defined over a number field. In particular, we give an explicit upper bound for the height of the points satisying a Liouville-type inequality. In the second part, we establish new measures of linear independence of logarithms over a commutative algebraic group. We focus our study on the rational case. Our approach combines Baker’s method (revisited by Philippon and Waldschmidt) with arguments from the slope theory. More importantly, we introduce a new argument to deal with the periodic case, inspired by previous works of Bertrand and Philippon. This method does not require the use of an extrapolation on derivations in the sense of Philippon-Waldschmidt. In this way, we are able to remove an important hypothesis in several theorems of Gaudron establishing lower bounds for linear forms in logarithms. Géométrie diophantienne Approximation diophantienne Géométrie d’Arakelov Théorie des pentes Points rationnels Formes linéaires de logarithmes Hauteurs Diophantine geometry Diophantine approximation Arakelov geometry Slope theory Rational points Linear forms in logarithms Heights
75	The real field with an irrational power function and a dense multiplicative subgroup Hieronymi, Philipp Christian Karl January 2008 (has links) In recent years the field of real numbers expanded by a multiplicative subgroup has been studied extensively. In this thesis, the known results will be extended to expansions of the real field. I will consider the structure R consisting of the field of real numbers and an irrational power function. Using Schanuel conditions, I will give a first-order axiomatization of expansions of R by a dense multiplicative subgroup which is a subset of the real algebraic numbers. It will be shown that every definable set in such a structure is a boolean combination of existentially definable sets and that these structures have o-minimal open core. A proof will be given that the Schanuel conditions used in proving these statements hold for co-countably many real numbers. The results mentioned above will also be established for expansions of R by dense multiplicative subgroups which are closed under all power functions definable in R. In this case the results hold under the assumption that the Conjecture on intersection with tori is true. Finally, the structure consisting of R and the discrete multiplicative subgroup 2^{Z} will be analyzed. It will be shown that this structure is not model complete. Further I develop a connection between the theory of Diophantine approximation and this structure. 512.786
76	Dělitelnost pro nadané žáky středních škol / Divisibility for talented students of secondary schools Živčáková, Andrea January 2014 (has links) This thesis is an educational text for high school students. It aims to teach them how to solve typical problems concerning divisibility found in mathematical correspondence seminars and mathematical olympiad. Basic notions from the theory of divisibility are recalled (e.g. prime numbers, divisors, multiples). Criteria of divisibility by 2 to 20 are introduced, as well as diophantine equations and practical applications of prime numbers in real life. One whole chapter is dedicated to problems and exercises. Powered by TCPDF (www.tcpdf.org)
77	On the birational section conjecture over function fields Tyler, Michael Peter January 2017 (has links) The birational variant of Grothendieck's section conjecture proposes a characterisation of the rational points of a curve over a finitely generated field over Q in terms of the sections of the absolute Galois group of its function field. While the p-adic version of the birational section conjecture has been proven by Jochen Koenigsmann, and improved upon by Florian Pop, the conjecture in its original form remains very much open. One hopes to deduce the birational section conjecture over number fields from the p-adic version by invoking a local-global principle, but if this is achieved the problem remains to deduce from this that the conjecture holds over all finitely generated fields over Q. This is the problem that we address in this thesis, using an approach which is inspired by a similar result by Mohamed Saïdi concerning the section conjecture for étale fundamental groups. We prove a conditional result which says that, under the condition of finiteness of certain Shafarevich-Tate groups, the birational section conjecture holds over finitely generated fields over Q if it holds over number fields. 510
78	Topics in analytic and combinatorial number theory Walker, Aled January 2018 (has links) In this thesis we consider three different issues of analytic number theory. Firstly, we investigate how residues modulo q may be expressed as products of small primes. In Chapter 1, we work in the regime in which these primes are less than q, and present some partial results towards an open conjecture of Erdös. In Chapter 2, we consider the kinder regime in which these primes are at most q<sup>C</sup> , for some constant C that is greater than 1. Here we reach an explicit version of Linnik's Theorem on the least prime in an arithmetic progression, saving that we replace 'prime' with 'product of exactly three primes'. The results of this chapter are joint with Prof. Olivier Ramaré. The next two chapters concern equidistribution modulo 1, specifically the notion that an infinite set of integers is metric poissonian. This strong notion was introduced by Rudnick and Sarnak around twenty years ago, but more recently it has been linked with concepts from additive combinatorics. In Chapter 3 we study the primes in this context, and prove that the primes do not enjoy the metric poissonian property, a theorem which, in passing, improves upon a certain result of Bourgain. In Chapter 4 we continue the investigation further, adapting arguments of Schmidt to demonstrate that certain random sets of integers, which are nearly as dense as the primes, are metric poissonian after all. The major work of this thesis concerns the study of diophantine inequalities. The use of techniques from Fourier analysis to count the number of solutions to such systems, in primes or in other arithmetic sets of interest, is well developed. Our innovation, following suggestions of Wooley and others, is to utilise the additive-combinatorial notion of Gowers norms. In Chapter 5 we adapt methods of Green and Tao to show that, even in an extremely general framework, Gowers norms control the number of solutions weighted by arbitrary bounded functions. We use this result to demonstrate cancellation of the Möbius function over certain irrational patterns. 510
79	Equações diofantinas lineares, quadráticas e aplicações / Diophantine linear equations, quadratics and applications Souza, Romario Sidrone [UNESP] 07 March 2017 (has links) Submitted by ROMARIO SIDRONE DE SOUZA null (romario.sidrone@gmail.com) on 2017-03-22T13:09:53Z No. of bitstreams: 1 Equações Diofantinas Lineares, Quadráticas e Aplicações.pdf: 841142 bytes, checksum: 07c262b2dc6963eba6f51b8c68808746 (MD5) / Rejected by Luiz Galeffi (luizgaleffi@gmail.com), reason: Solicitamos que realize uma nova submissão seguindo a orientação abaixo: O arquivo submetido não contém o certificado de aprovação. O arquivo submetido está sem a ficha catalográfica. A versão submetida por você é considerada a versão final da dissertação/tese, portanto não poderá ocorrer qualquer alteração em seu conteúdo após a aprovação. Corrija esta informação e realize uma nova submissão com o arquivo correto. Agradecemos a compreensão. on 2017-03-22T19:27:07Z (GMT) / Submitted by ROMARIO SIDRONE DE SOUZA null (romario.sidrone@gmail.com) on 2017-03-23T17:44:35Z No. of bitstreams: 1 Equações Diofantinas Lineares, Quadráticas e Aplicações.pdf: 921393 bytes, checksum: d6bb7d5e6be28758897ddf73120e42b2 (MD5) / Approved for entry into archive by Luiz Galeffi (luizgaleffi@gmail.com) on 2017-03-24T17:25:51Z (GMT) No. of bitstreams: 1 souza_rs_me_rcla.pdf: 921393 bytes, checksum: d6bb7d5e6be28758897ddf73120e42b2 (MD5) / Made available in DSpace on 2017-03-24T17:25:51Z (GMT). No. of bitstreams: 1 souza_rs_me_rcla.pdf: 921393 bytes, checksum: d6bb7d5e6be28758897ddf73120e42b2 (MD5) Previous issue date: 2017-03-07 / Este trabalho é resultado de uma pesquisa bibliográfica sobre Diofanto e as equações que levam seu nome, as equações diofantinas. Mais especificamente, apresentamos as equações diofantinas lineares e alguns casos particulares das equações diofantinas quadráticas. Ainda, abordamos um estudo sobre alguns tópicos de teoria dos números e frações contínuas, afim de facilitar o entendimento sobre os teoremas e resultados acerca do tema central deste trabalho. / This work is the result of a bibliographical research about Diophantus and the equations that take his name, the Diophantine equations. More specifically, we present the linear diophantine equations and some particular cases of the quadratic diophantine equations. We have also studied topics about number theory and continuous fractions, in order to facilitate the understanding of theorems and results that are related to the central theme of this work. Álgebra Diofanto Equações diofantinas Teoria dos números Algebra Diophantus Diophantine equations Number theory
80	Some Diophantine Problems January 2019 (has links) abstract: Diophantine arithmetic is one of the oldest branches of mathematics, the search for integer or rational solutions of algebraic equations. Pythagorean triangles are an early instance. Diophantus of Alexandria wrote the first related treatise in the fourth century; it was an area extensively studied by the great mathematicians of the seventeenth century, including Euler and Fermat. The modern approach is to treat the equations as defining geometric objects, curves, surfaces, etc. The theory of elliptic curves (or curves of genus 1, which are much used in modern cryptography) was developed extensively in the twentieth century, and has had great application to Diophantine equations. This theory is used in application to the problems studied in this thesis. This thesis studies some curves of high genus, and possible solutions in both rationals and in algebraic number fields, generalizes some old results and gives answers to some open problems in the literature. The methods involve known techniques together with some ingenious tricks. For example, the equations $y^2=x^6+k$, $k=-39,\,-47$, the two previously unsolved cases for $\|k\|<50$, are solved using algebraic number theory and the ‘elliptic Chabauty’ method. The thesis also studies the genus three quartic curves $F(x^2,y^2,z^2)=0$ where F is a homogeneous quadratic form, and extend old results of Cassels, and Bremner. It is a very delicate matter to find such curves that have no rational points, yet which do have points in odd-degree extension fields of the rationals. The principal results of the thesis are related to surfaces where the theory is much less well known. In particular, the thesis studies some specific families of surfaces, and give a negative answer to a question in the literature regarding representation of integers n in the form $n=(x+y+z+w)(1/x+1/y+1/z+1/w).$ Further, an example, the first such known, of a quartic surface $x^4+7y^4=14z^4+18w^4$ is given with remarkable properties: it is everywhere locally solvable, yet has no non-zero rational point, despite having a point in (non-trivial) odd-degree extension fields of the rationals. The ideas here involve manipulation of the Hilbert symbol, together with the theory of elliptic curves. / Dissertation/Thesis / Doctoral Dissertation Mathematics 2019 Mathematics algebraic number theory Diophantine equations elliptic curve elliptic curve Chabauty number theory p-adic analysis

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