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1	Quadratic forms of matrices Parkash, Prem 01 August 1968 (has links) No description available. Quadratic forms matrices Mathematics
2	Reduced positive quaternary quadratic forms Townes, Stanmore Brooks, January 1936 (has links) Thesis (Ph. D.)--University of Chicago, 1936. / Vita. Lithoprinted. "Private edition, distributed by the University of Chicago libraries, Chicago, Illinois." Forms, Quadratic. Forms, Quaternary.
3	Quaternion Algebras and Quadratic Forms Zi Yang, Sham 08 May 2008 (has links) The main goal of this Masters' thesis is to explore isomorphism types of quaternion algebras using the theory of quadratic forms, number theory and algebra. I would also present ways to characterize quaternion algebras, and talk about how quaternion algebras are important in Brauer groups by describing a theorem proved by Merkurjev in 1981. quadratic forms quaternion algebras Accounting
4	Quaternion Algebras and Quadratic Forms Zi Yang, Sham 08 May 2008 (has links) The main goal of this Masters' thesis is to explore isomorphism types of quaternion algebras using the theory of quadratic forms, number theory and algebra. I would also present ways to characterize quaternion algebras, and talk about how quaternion algebras are important in Brauer groups by describing a theorem proved by Merkurjev in 1981. quadratic forms quaternion algebras Accounting
5	Determination of Quadratic Lattices by Local Structure and Sublattices of Codimension One Meyer, Nicolas David 01 May 2015 (has links) For definite quadratic lattices over the rings of integers of algebraic number fields, it is shown that lattices are determined up to isometry by their local structure and sublattices of codimension 1. In particular, a theorem of Yoshiyuki Kitaoka for $\mathbb{Z}$-lattices is generalized to definite lattices over algebraic number fields. Algebraic Number Theory Quadratic Forms
6	Um teorema de Witt sobre a imersão de extensões bioquadraticas em quaternionicas / A Witt's theorem about the imersion of bioquadratic extensions in quaternionics Oliveira Junior, Mauro Ribeiro de 17 March 2006 (has links) Orientador: Antonio Jose Engler / Dissertação (mestrado) - Universidade Estadual de Campinas, Instituto de Matematica, Estatistica e Computação Cientifica / Made available in DSpace on 2018-08-06T01:37:33Z (GMT). No. of bitstreams: 1 OliveiraJunior_MauroRibeirode_M.pdf: 283417 bytes, checksum: ed6ca467b6f01b1fd631b10cca398846 (MD5) Previous issue date: 2006 / Resumo: Neste trabalho seguimos, nos quatro primeiros capítulos, para a construção efetiva de extensões quaterniônicas, a partir do acúmulo de informações obtidas nos capítulos iniciais 1 e 2, sobre a estrutura dos subcorpos intermediários a uma extensão deste tipo, conhecimentos quais são obtidos pela atuação forte da Teoria de Galois, uma vez que é muito bem conhecida a estrutura de subgrupos do grupos dos Quatérnios. Finalmente, em posse dos resultados e caracterizações dos capítulos precedentes, juntamente aos resultados que relacionam formas quadráticas e álgebras quaterniônicas, no capítulo 6 demonstramos o Critério de Witt, que acerta sobre a imersão de extensões biquadráticas em quaterniônicas. Deste critério obtemos um importante resultado de interesse da Teoria dos Números, uma nova caracterização dos números racionais que são somas de três quadrados / Mestrado / Algebra / Mestre em Matemática Galois, Teoria de Formas quadráticas Quadratic forms
7	On Orbits of SL(2,Z)$_+$ and Values of Binary Quadratic Forms on Positive Integral Pairs dani@math.tifr.res.in 09 June 2001 (has links) No description available.
8	Square Forms Factoring with Sieves Clinton W Bradford (10732485) 05 May 2021 (has links) Square Form Factoring is an <i>O</i>(<i>N</i><sup>1/4</sup>) factoring algorithm developed by D. Shanks using certain properties of quadratic forms. Central to the original algorithm is an iterative search for a square form. We propose a new subexponential-time algorithm called SQUFOF2, based on ideas of D. Shanks and R. de Vogelaire, which replaces the iterative search with a sieve, similar to the Quadratic Sieve. Algebra and Number Theory factoring factoring algorithms subexponential factoring algorithms quadratic forms SQUFOF SQUFOF2 Square Forms Factoring square forms integral binary quadratic forms indefinite quadratic forms polynomial sieves quadratic sieve infrastructure distance
9	STRICT REGULARITY OF POSITIVE DEFINITE TERNARY QUADRATIC FORMS Alsulaimani, Hamdan 01 December 2016 (has links) An integral quadratic form is said to be strictly regular if it primitively represents all integers that are primitively represented by its genus. The goal of this dissertation is to extend the systematic investigation of the positive deﬁnite ternary primitive integral quadratic forms and lattices that are candidates for strict regularity. An integer that is primitively represented by a genus, but not by some speciﬁc form in that genus, is called a primitive exception for that form. So, the strictly regular forms are those forms for which there are no primitive exceptions. Our computations of primitive exceptions for each of the 119 positive deﬁnite regular ternary forms which lie in multiple-class genera, and of the companion forms in their genera, show that there are 45 inequivalent such forms that are candidates for strict regularity. We provide a proof of the strict regularity of one of these candidates, bringing the total number of forms for which such proofs are known to 15, and prove partial results on the integers primitively represented by the other form in its genus. The theory of primitive spinor exceptional integers is used to analyze the primitive exceptions for the forms in two other genera known to contain a regular ternary form. In these cases, results are obtained relating the primitive representation of certain integers c by a given form in one of these genera to the primitive representation of the integers 4c and 9c by the forms in the genus. primitive exceptions strictly regular
10	Cohomological Invariants of Quadratic Forms Harvey, Ebony Ann January 2010 (has links) Thesis advisor: Benjamin V. Howard / Given a field <italic>F</italic>, an algebraic closure <italic>K</italic> and an <italic>F</italic>-vector space <italic>V</italic>, we can tensor the space <italic>V</italic> with the algebraic closure <italic>K</italic>. Two quadratic spaces of the same dimension become isomorphic when tensored with an algebraic closure. The failure of this isomorphism over <italic>F</italic> is measured by the Hasse invariant. This paper explains how the determinants and Hasse Invariants of quadratic forms are related to certain cohomology classes constructed from specific short exact sequences. In particular, the Hasse Invariant is defined as an element of the Brauer group. / Thesis (MA) — Boston College, 2010. / Submitted to: Boston College. Graduate School of Arts and Sciences. / Discipline: Mathematics. Central Simple Algebra cocycles and coboundaries Cohomology factor sets Hasse Invariant Quadratic Forms

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