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51	The solvability of polynomials by radicals: A search for unsolvable and solvable quintic examples Beyronneau, Robert Lewis 01 January 2005 (has links) This project centers around finding specific examples of quintic polynomials that were and were not solvable. This helped to devise a method for finding examples of solvable and unsolvable quintics. Polynomials Algebra Galois theory Algebraic fields Quadratic differentials Algebra
52	Galois Theory and its Application to the Problem of Solvability by Radicals of an Equation Over a Field of Prime or Zero Characteristic Ronald, Rupert George 05 1900 (has links) In Part I of the thesis an account is given of the basic algebra of extension fields which is required for the understanding of Galois theory. The fundamental theorem states the relationships of the subgroups of a permutation group of the root field of an equation to the subfields which are left invariant by these subgroups. Extensions of the basic theorem conclude Part I. In part II the solvability of equations by radicals is discussed, for fields of characteristic zero. A discussion of finite fields and primitive roots leads to a criterion for the solvability by radicals of equations over fields of prime characteristic. Finally, a method for determining the Galois group of any equation is discussed. Most of the material in the introductory chapters is taken from Artin's: Galois Theory (cf. p. 120). / Thesis / Master of Arts (MA)
53	On the construction of balanced and partially balanced factorial experiments Chang, Cheng-Tao January 1982 (has links) Satisfactory systems of confounding for symmetrical factorial experiments can be constructed oy the familiar methods, using the. theory of Galois fields. Although these methods can be extended to asymmetrical factorial experiments· (White and Hultquist, 1965; Raktoe, 1969) the actual construction of designs becomes much mor:e complicated for the general case and does not always lead to satisfactory plans. A different approach to this problem is to consider balanced factorial experiments (BFE), due to Shah (1958, 1960). Such BFE have a one-to-one relationship to EGD-PBIB designs given by Hinkelmann (1964). The problem of constructing BFE is then equivalent to constructing EGD-PBIB designs. A new method is proposed here to construct such designs. This method is based upon the so-called (1,1, ...,1)th-associate matrix and the operations symbolic direct product (SDP), generalized symbolic direct product (GSDP), symbolic direct multiplication (SDM), and generalized symbolic direct multiplication (GSDM). Let A₁ , A₂, ... , A<sub>n</sub> be n factors in a factorial experiment, with A<sub>i</sub> having t<sub>i</sub> levels (i = 1, 2, ... , n). It is shown that an EGD-PBIB design with blocks of size t<sub>i</sub> can be constructed, provided that t<sub>i</sub>ᵢ ≠ max ( t₁ , t₂, . . . , t<sub>n</sub> ). This method is more general and more flexible than the method of Aggarwal (1974) in that any two treatment combinations can be γ-th associates where γ has at least two unity components, and it can be shown the number of possible candidates for such is 2<sup>n-i l</sup> -1 for blocks of size t<sub>i</sub> (i = 1, 2, .. , n -1), where t₁ < t₂ <...< t<sub>n</sub>. This method is also more general than the Kronecker product method due to Vartak (1955}. Two types of PBIB designs· are used for reducing the numbers of associa,te classes in EGD-PBIB designs. When the t<sub>i</sub> (i = 1, 2, ... , n) are equal, then some EGD-PBIB designs can be reduced to a hypercubic design. The EGD-PBIB designs with block size π [below jεA] t<sub>j</sub>, where A is an arbitrary subset of the set {1, 2, ... , n} can be reduced to newly introduced F<sub>A</sub><sup>(n)</sup>-type PBIR designs. Since BFE results very often in designs with a large number of blocks, the notion of partial balanced factorial experiment (PBFE) has been introduced. It is investigated how such designs can be constructed and related to PBIB-designs similar to that between BFE and EGD-PBIB designs. Two new types of PBIB designs have been introduced in this context. / Ph. D. LD5655.V856 1982.C524 Factorial experiment designs Galois theory
54	Topics in Inverse Galois Theory Wills, Andrew Johan 19 May 2011 (has links) Galois theory, the study of the structure and symmetry of a polynomial or associated field extension, is a standard tool for showing the insolvability of a quintic equation by radicals. On the other hand, the Inverse Galois Problem, given a finite group G, find a finite extension of the rational field Q whose Galois group is G, is still an open problem. We give an introduction to the Inverse Galois Problem and compare some radically different approaches to finding an extension of Q that gives a desired Galois group. In particular, a proof of the Kronecker-Weber theorem, that any finite extension of Q with an abelian Galois group is contained in a cyclotomic extension, will be discussed using an approach relying on the study of ramified prime ideals. In contrast, a different method will be explored that defines rigid groups to be groups where a selection of conjugacy classes satisfies a series of specific properties. Under the right conditions, such a group is also guaranteed to be the Galois group of an extension of Q. / Master of Science Kronecker-Weber Theorem Rigid Groups Inverse Galois Theory
55	Definable henselian valuations and absolute Galois groups Jahnke, Franziska Maxie January 2014 (has links) This thesis investigates the connections between henselian valuations and absolute Galois groups. There are fundamental links between these: On one hand, the absolute Galois group of a field often encodes information about (henselian) valuations on that field. On the other, in many cases a henselian valuation imposes a certain structure on an absolute Galois group which makes it easier to study. We are particularly interested in the question of when a field admits a non-trivial parameter-free definable henselian valuation. By a result of Prestel and Ziegler, this does not hold for every henselian valued field. However, improving a result by Koenigsmann, we show that there is a non-trivial parameter-free definable valuation on every henselian valued field. This allows us to give a range of conditions under which a henselian field does indeed admit a non-trivial parameter-free definable henselian valuation. Most of these conditions are in fact of a Galois-theoretic nature. Throughout the thesis, we discuss a number of applications of our results. These include fields elementarily characterized by their absolute Galois group, model complete henselian fields and henselian NIP fields of positive characteristic, as well as PAC and hilbertian fields. 515
56	Sobre a existência ou não de bases normais auto-duais para extensões galoisianas de corpos / About the existence or not of self-dual normal bases for finite galosian extensions of fields Coutinho, Sávio da Silva 20 March 2009 (has links) Neste trabalho, apresentamos um estudo sobre a existência ou não de bases normais auto-duais para extensões galoisianas finitas de corpos, mostrando que toda extensão galoisiana finita de grau ímpar posui uma base normal auto-dual, enquanto que para extensões galoisianas de grau par, apresentamos algumas condições suficientes que garantem a não existência de bases normais auto-duais / In this work, we present a study about the existence or not of self-dual normal bases for finite galoisian extensions of fields, showing that all the odd degree finite galoisian extension has a self-dual normal base, whereas for even degree galoisian extensions, we present some sufficient conditions that assure the non-existence of self-dual normal bases Bases normais auto-duais Extensions of fields Extensões de corpos Galois theory Self-dual normal bases Teoria de Galois
57	Regular realizations of p-groups Hammond, John Lockwood 01 October 2012 (has links) This thesis is concerned with the Regular Inverse Galois Problem for p-groups over fields of characteristic unequal to p. Building upon results of Saltman, Dentzer characterized a class of finite groups that are automatically realized over every field, and proceeded to show that every group of order dividing p⁴ belongs to this class. We extend this result to include groups of order p⁵, provided that the base field k contains the p³-th roots of unity. The proof involves reducing to certain Brauer embedding problems defined over the rational function field k(x). Through explicit computation, we describe the cohomological obstructions to these embedding problems. Then by applying results about the Brauer group of a Dedekind domain, we show that they all possess solutions. / text Inverse Galois theory Group theory Homology theory Brauer groups Rings (Algebra) Embeddings (Mathematics)
58	Regular realizations of p-groups Hammond, John Lockwood, January 1900 (has links) Thesis (Ph. D.)--University of Texas at Austin, 2008. / Vita. Includes bibliographical references.
59	Geometric actions of the absolute Galois group Joubert, Paul 03 1900 (has links) Thesis (MSc (Mathematics))--University of Stellenbosch, 2006. / This thesis gives an introduction to some of the ideas originating from A. Grothendieck's 1984 manuscript Esquisse d'un programme. Most of these ideas are related to a new geometric approach to studying the absolute Galois group over the rationals by considering its action on certain geometric objects such as dessins d'enfants (called stick figures in this thesis) and the fundamental groups of certain moduli spaces of curves. I start by defining stick figures and explaining the connection between these innocent combinatorial objects and the absolute Galois group. I then proceed to give some background on moduli spaces. This involves describing how Teichmuller spaces and mapping class groups can be used to address the problem of counting the possible complex structures on a compact surface. In the last chapter I show how this relates to the absolute Galois group by giving an explicit description of the action of the absolute Galois group on the fundamental group of a particularly simple moduli space. I end by showing how this description was used by Y. Ihara to prove that the absolute Galois group is contained in the Grothendieck-Teichmuller group. Dissertations -- Mathematics Theses -- Mathematics Galois theory Geometric group theory Algebraic fields
60	O nÃmero de classes do subcorpo real maximal de um corpo ciclotÃmico / On the class number of the maximal real subfield of a cyclotomic field Fernando Neres de Oliveira 25 February 2010 (has links) Conselho Nacional de Desenvolvimento CientÃfico e TecnolÃgico / O objetivo principal deste trabalho Ã apresentar alguns resultados, relativos ao nÃmero de classes do subcorpo real maximal de um corpo ciclotÃmico.Para isso, iremos inicialmente provar a finitude do grupo das classes de ideais e fazer um breve estudo da decomposiÃÃo de ideais primos em uma extensÃo. Na sequÃncia, apresentaremos o subcorpo real maximal de um corpo ciclotÃmico e usaremos alguns resultados relativos a caracteres e somas gaussianas, para justificar a imersÃo de um corpo quadrÃtico real em um subcorpo real maximal particular. Depois disso, vamos apresentar os resultados de dois artigos, o primeiro de N. C. Ankeny, S. Chowla E H. Hasse, e o segundo de Hideo Yokoi. Ambos tem por objetivo, estudar o nÃmero de classes do subcorpo real maximal de um corpo ciclotÃmico. / The aim of this paper is to present some results on the number of classes of real maximal subcorpo a body ciclotÃmico.Para this, we will first prove the finiteness of the group of classes of ideals and make a brief study of the decomposition of prime ideals in a extension. Following, we present the real subcorpo a maximal cyclotomic fields and will use some results on the characters and Gaussian sums, to justify the dumping of a body in a real quadratic subcorpo maximal real particular. After that, we present the results of two articles, the first of N. C. Ankeny, S. Chowla and H. Hasse, and the second of Hideo Yokoi. Both have the objective of studying the number of classes of real subcorpo a maximal cyclotomic fields. ideais Galois, teoria de grupos abelianos ideals galois theory abelian groups TEORIA DOS NUMEROS

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