Global ETD Search

101	Content Algebras and Zero-Divisors / Inhaltsalgebren und Nullteiler Nasehpour, Peyman 10 February 2011 (has links) This thesis concerns two topics. The first topic, that is related to the Dedekind-Mertens Lemma, the notion of the so-called content algebra, is discussed in chapter 2. Let $R$ be a commutative ring with identity and $M$ be a unitary $R$-module and $c$ the function from $M$ to the ideals of $R$ defined by $c(x) = \cap \lbrace I \colon I \text{~is an ideal of~} R \text{~and~} x \in IM \rbrace $. $M$ is said to be a \textit{content} $R$-module if $x \in c(x)M $, for all $x \in M$. The $R$-algebra $B$ is called a \textit{content} $R$-algebra, if it is a faithfully flat and content $R$-module and it satisfies the Dedekind-Mertens content formula. In chapter 2, it is proved that in content extensions, minimal primes extend to minimal primes, and zero-divisors of a content algebra over a ring which has Property (A) or whose set of zero-divisors is a finite union of prime ideals are discussed. The preservation of diameter of zero-divisor graph under content extensions is also examined. Gaussian and Armendariz algebras and localization of content algebras at the multiplicatively closed set $S^ \prime = \lbrace f \in B \colon c(f) = R \rbrace$ are considered as well. In chapter 3, the second topic of the thesis, that is about the grade of the zero-divisor modules, is discussed. Let $R$ be a commutative ring, $I$ a finitely generated ideal of $R$, and $M$ a zero-divisor $R$-module. It is shown that the $M$-grade of $I$ defined by the Koszul complex is consistent with the definition of $M$-grade of $I$ defined by the length of maximal $M$-sequences in I$. Chapter 1 is a preliminarily chapter and dedicated to the introduction of content modules and also locally Nakayama modules. content module content algebra locally Nakayama module weak content algebra few zero-divisors Gaussian algebra Armendariz algebra zero-divisor graph Grade homological dimension Property (A) Zero-divisor module semigroup ring semigroup module local cohomological module McCoy's property minimal prime primal ring 31.23 - Ideale, Ringe, Moduln, Algebren 31.12 - Kombinatorik, Graphentheorie 13-02 - Research exposition ddc:510
102	Géométrisation du côté orbital de la formule des traces / Geometrisation of the orbital side of the Trace Formula Bouthier, Alexis 11 April 2014 (has links) Ce travail de thèse a pour but de construire et d’étudier une fibration de Hitchin pour les groupes qui apparaît naturellement lorsque l’on essaie de géométriser la formule des traces. On commence par construire une telle fibration en utilisant le semi-groupe de Vinberg. Sur ce semi-groupe de Vinberg, on montre qu’il existe un certain morphisme « polynôme caractéristique » muni d’une section naturelle, de même que dans le cas des algèbres de Lie. On montre également que l’on peut construire un centralisateur régulier au-dessus de cette base des polynômes caractéristiques qui est un schéma en groupes commutatif et lisse.On s’intéresse alors à des variantes pour les groupes des fibres de Springer affines pour lesquelles on remarque que l’introduction du semi-groupe de Vinberg permet d’obtenir une condition d’intégralité analogue à celle de Kazhdan-Lusztig. Ces fibres de Springer affines sont des analogues locaux des fibres de Hitchin. On obtient alors une formule de dimension pour ces fibres.Dans un troisième temps, on s’intéresse à l’aspect global de cette fibration pour laquelle on donne une interprétation modulaire et sur laquelle on construit l’action d’un champ de Picard, issu du centralisateur régulier. L’espace total de cette fibration étant en général singulier, nous étudions son complexe d’intersection. Cet espace de Hitchin s’obtient naturellement comme l’intersection du champ de Hecke avec la diagonale du champ des G-torseurs et on démontre que sur un ouvert suffisamment gros de la base de Hitchin, le complexe d’intersection de l’espace de Hitchin s’obtient par restriction de celui du champ de Hecke corrrespondant.Enfin, dans la dernière partie de cette thèse, on établit un théorème du support dans le cas où l’espace total est singulier analogue à celui de Ngô et l’on démontre que, dans le cas de la fibration de Hitchin, les supports qui interviennent sont reliés aux strates endoscopiques. / This main goal of this work is to construct and study the properties of Hitchin fibration for groups which appears naturally when we try to geometrize the trace formula. We begin by constructing this fibration using the Vinberg’s semigroup. On this semigroup, we show that there exists a characteristic polynomial morphism equipped with a natural section, analog at the Kostant’s one in the case of Lie algebras. We also show that there exists on the base of characteristic polynomials a regular centralizer scheme, which is a smooth commutative group scheme.Then, we are interested in some variant of affine Springer fibers, for which we see that the Vinberg’s semigroup appears naturally to obtain an integrality condition analog to Kazhdan-Lusztig’s one. These affine Springer fibers are local incarnation of Hitchin fibers.In a third time, we go back to the global case and give a modular interpretation of this new Hitchin fibration on which we construct an action of a Picard stack, coming from the regular centralizer.The total space of this fibration, even on the generically regular semisimple locus will be singular and we want to understand his intersection complex. This space can be obtained as the intersection of the Hecke stack with the diagonal of the stack of G-bundles and we show that on a sufficiently big open subset of the Hitchin base, the intersection complex of the Hitchin’s space is the restriction of the corresponding intersection complex on the Hecke stack.Finally, in the last part of this work, we establish a support theorem in the case of a singular total space, generalizing Ngo’s theorem et we show that in the case of Hitchin fibration, the supports that appear are related to the endoscopic strata. Fibration de Hitchin Intégrales orbitales Champ de Hecke Semigroupe de Vinberg Section de Steinberg Formule des traces Fibres de Springer affines Théorème du support Hitchin fibration Orbital integrals Hecke stack Vinberg’s semigroup Steinberg’s section Trace formula Affine Springer fibers Support theorem
103	Teoria de semigrupos e aplicações a equações impulsivas com retardamento dependendo do estado / Semigroup theory and applications to impulsive differential equation with state-dependent delay União, Gabriel Gonçalves 17 April 2006 (has links) Neste trabalho estudaremos a existência de soluções fracas para uma classe de equações diferenciais funcionais impulsivas com retardamento dependendo do estado modeladas na forma \'x POT. PRIME\'(t) = Ax(t) + f(t;\' x IND. p(t, xt)), t \'PERTENCE A\'I = [0,a], \'x IND. 0\' =\\varphi \'PERTENCE A\' B, \'DELTA\' \'x(t IND. i) = \'I IND.i\'i(\'x IND.i\'); i = 1, ...n, onde A é o gerador infinitesimal de um \'C IND. 0\'-semigrupo compacto de operadores lineares limitados (\'T\'(t))t \'. OU =\'0 definido em um espaço de Banach X; as fun»ções \'x IND. s\' : (- \'INFIINITO\', 0] \'SETA\' X, \'x IND. s\' ( teta\') = x(s + \'teta\'), estão em um espaço de fase B descrito axiomaticamente; f : I X B \'seta\' X, \'rô\' : I X B \'SETA\' ( - \'INFINITO\', a], \'I IND. i\' : B \'SETA\'X, i=1, ...n , são funções apropriadas; 0 < \'t IND.1\' <... < \'t IND. n\' < a são n¶umeros pré-fixados e o símbolo \'DELTA\'\'ksi\'(t) = \'Ksi\'(\'t POT. + ) - \'ksi\'( \'t POT. -). / In this work we stablish the existence of mild solutions for an impulsive abstract functional differential equation with state-dependent delay described in the form \'x POT. PRIME\'(t) = Ax(t) + f(t;\' x IND. p(t, xt)), t \'BELONGS\'I = [0,a], \'x IND. 0\' =\\varphi \'IS CONTAINED\' B, \'DELTA\' \'x(t IND. i) = \'I IND.i\'i(\'x IND.i\'); i = 1, ...n, where A is the infinitesimal generator of a compact \'C IND. 0\'-semigroup of bounded linear operators (\'T\'(t))t \'. OU =\'0 defined on a Banach space X; the functions \'x IND. s\': ( - INFINito, 0] \'SETA X, \'x IND. s\'(\'teta\') , belongs to some space B described axiomatically; f : I X B \'seta\' X, \'rô\' : I X B \'SETA\' ( - \'INFINITO\', a], \'I IND. i\' : B \'SETA\'X, i=1, ...n , são funções apropriadas; 0 < \'t IND.1\' <... < \'t IND. n\' < a são n¶umeros pré-fixados e o símbolo \'DELTA\'\'ksi\'(t) = \'Ksi\'(\'t POT. + ) - \'ksi\'( \'t POT. -). Equações impulsivas Impulsive differential equations O Problema de Cauchy abstrato Semigroup theory Teoria de semigrupos The Abstract Cauchy problem
104	Mathematical analysis of generalized linear evolution equations with the non-singular kernel derivative Toudjeu, Ignace Tchangou 02 1900 (has links) Linear Evolution Equations (LEE) have been studied extensively over many years. Their extension in the field of fractional calculus have been defined by Dαu(x, t) = Au(x, t), where α is the fractional order and Dα is a generalized differential operator. Two types of generalized differential operators were applied to the LEE in the state-of-the-art, producing the Riemann-Liouville and the Caputo time fractional evolution equations. However the extension of the new Caputo-Fabrizio derivative (CFFD) to these equations has not been developed. This work investigates existing fractional derivative evolution equations and analyze the generalized linear evolution equations with non-singular ker- nel derivative. The well-posedness of the extended CFFD linear evolution equation is demonstrated by proving the existence of a solution, the uniqueness of the existing solu- tion, and finally the continuous dependence of the behavior of the solution on the data and parameters. Extended evolution equations with CFFD are applied to kinetics, heat diffusion and dispersion of shallow water waves using MATLAB simulation software for validation purpose. / Mathematical Science / M Sc. (Applied Mathematics) Mathematical analysis Evolution equation Caputo-Fabrizio derivative Diffusion equation Fractional calculus Non-singular kernel derivative Fractional derivative Solution operators Semigroup Well-posedness 519.8 Applied Mathematics Mathematical analysis Evolution equations Fractional calculus Heat equation
105	The Diamond Lemma for Power Series Algebras Hellström, Lars January 2002 (has links) <p>The main result in this thesis is the generalisation of Bergman's diamond lemma for ring theory to power series rings. This generalisation makes it possible to treat problems in which there arise infinite descending chains. Several results in the literature are shown to be special cases of this diamond lemma and examples are given of interesting problems which could not previously be treated. One of these examples provides a general construction of a normed skew field in which a custom commutation relation holds.</p><p>There is also a general result on the structure of totally ordered semigroups, demonstrating that all semigroups with an archimedean element has a (up to a scaling factor) unique order-preserving homomorphism to the real numbers. This helps analyse the concept of filtered structure. It is shown that whereas filtered structures can be used to induce pretty much any zero-dimensional linear topology, a real-valued norm suffices for the definition of those topologies that have a reasonable relation to the multiplication operation.</p><p>The thesis also contains elementary results on degree (as of polynomials) functions, norms on algebras (in particular ultranorms), (Birkhoff) orthogonality in modules, and construction of semigroup partial orders from ditto quasiorders.</p> Mathematical analysis diamond lemma power series algebra Gröbner basis embedding into skew fields archimedean element in semigroup q-deformed Heisenberg--Weyl algebra polynomial degree ring norm Birkhoff orthogonality filtered structure Matematisk analys Mathematical analysis Analys
106	The Diamond Lemma for Power Series Algebras Hellström, Lars January 2002 (has links) The main result in this thesis is the generalisation of Bergman's diamond lemma for ring theory to power series rings. This generalisation makes it possible to treat problems in which there arise infinite descending chains. Several results in the literature are shown to be special cases of this diamond lemma and examples are given of interesting problems which could not previously be treated. One of these examples provides a general construction of a normed skew field in which a custom commutation relation holds. There is also a general result on the structure of totally ordered semigroups, demonstrating that all semigroups with an archimedean element has a (up to a scaling factor) unique order-preserving homomorphism to the real numbers. This helps analyse the concept of filtered structure. It is shown that whereas filtered structures can be used to induce pretty much any zero-dimensional linear topology, a real-valued norm suffices for the definition of those topologies that have a reasonable relation to the multiplication operation. The thesis also contains elementary results on degree (as of polynomials) functions, norms on algebras (in particular ultranorms), (Birkhoff) orthogonality in modules, and construction of semigroup partial orders from ditto quasiorders. Mathematical analysis diamond lemma power series algebra Gröbner basis embedding into skew fields archimedean element in semigroup q-deformed Heisenberg--Weyl algebra polynomial degree ring norm Birkhoff orthogonality filtered structure Matematisk analys Mathematical analysis Analys
107	The Symbol of a Markov Semimartingale Schnurr, Alexander 10 June 2009 (has links) (PDF) We prove that every (nice) Feller process is an It^o process in the sense of Cinlar, Jacod, Protter and Sharpe (1980). Next we generalize the notion of the symbol and define it for this larger class of processes. As examples the solutions of stochastic differential equations are considered. The symbol is then used to derive a quick approach to the semimartingale characteristics as well as the generator of the process under consideration. Finally we give some examples of how our methods work for processes used in mathematical finance. / Wir haben gezeigt, dass jeder (nette) Feller Prozess ein It^o Prozess im Sinne von Cinlar, Jacod, Protter und Sharpe (1980) ist. Es stellt sich heraus, dass man den Begriff des Symbols, der für Feller Prozesse bekannt ist, auf diese größere Klasse verallgemeinern kann. Dieses Symbol haben wir für die Lösungen verschiedener stochastischer Differentialgleichungen berechnet. Außerdem haben wir gezeigt, dass das Symbol einen schnellen Zugang zur Berechnung der Semimartingal-Charakteristiken und des Erzeugers eines It^o Prozesses liefert. Zuletzt wurden die Ergebnisse auf Prozesse angewendet, die in der Finanzmathematik gebräuchlich sind. - (Die Dissertation ist veröffentlicht im Shaker Verlag GmbH, Postfach 101818, 52018 Aachen, Deutschland, http://www.shaker.de, ISBN: 978-3-8322-8244-8) Markov process semimartingale Itô process Feller semigroup generator symbol pseudo differential operator stochastic differential equation COGARCH process Markov Prozess Semimartingal Itô Prozess Feller Halbgruppe Erzeuger Symbol Pseudo-Differential-Operator stochastische Differentialgleichung COGARCH Prozess ddc:510 rvk:SK 820
108	Some questions in combinatorial and elementary number theory Tringali, Salvatore 26 November 2013 (has links) (PDF) This thesis is divided into two parts. Part I is about additive combinatorics. Part II deals with questions in elementary number theory. In Chapter 1, we generalize the Davenport transform to prove that if si S\mathbb A=(A, +)S is acancellative semigroup (either abelian or not) and SX, YS are non-empty subsets of SAS such that the subsemigroup generated by SYS is abelian, then SS\|X+Y\|\gc\min(\gamma(Y, \|X\|+\|Y\|-I)SS, where for SZ\subsetcq AS we let S\gamma(Z):=\sup_{z_0\in Z^\times}\in f_(z_0\nc z\inZ) (vm ord)(z-z_0)S. This implies an extension of Chowla's and Pillai's theorems for cyclic groups and a stronger version of an addition theorem by Hamidoune and Karolyi for arbitrary groups. In Chapter 2, we show that if S(A, +) is a cancellative semigroup and SX, Y\subsetcq AS then SS\|X+Y\|\gc\min(\gammaX+Y), \|X\|+\|Y\|-I)SS. This gives a generalization of Kemperman's inequality for torsion free groups and a stronger version of the Hamidoune-Karolyi theorem. In Chapter 3, we generalize results by Freiman et al. by proving that if S(A,\ctlot)S is a linearly orderable semigroup and SSS is a finite subset of SAS generating a non-abelian subsemigroup, then S\|S^2-\gc3\|S\|-2S. In Chapter 4, we prove results related to conjecture by Gyory and Smyth on the sets SR_k^\pm(a,b)S of all positive integers SnS such that Sn^kS divides Sa^a \pmb^nS for fixed integers SaS, SbS and SkS with Sk\gc3S, S\|ab\|\gc2Set S\gcd(a,b) = 1S. In particular, we show that SR_k^pm(a,b)S is finite if Sk\gc\max(\|a\|.\|b\|)S. In Chapter 5, we consider a question on primes and divisibility somchow related to Znam's problem and the Agoh-Giuga conjecture [MATH:MATH_CO] Mathematics/Combinatorics Additive combinatorics Cauchy-Davenport type theorems Freiman's theory of set addition Additive group and semigroup theory Minkowski sumsets Ordered groups Cyclic congruences
109	Análise de estabilidade de sistemas dinâmicos híbridos e descontínuos modelados por semigrupos: Pena, Ismael da Silva [UNESP] 26 February 2008 (has links) (PDF) Made available in DSpace on 2014-06-11T19:26:55Z (GMT). No. of bitstreams: 0 Previous issue date: 2008-02-26Bitstream added on 2014-06-13T18:30:53Z : No. of bitstreams: 1 pena_is_me_sjrp.pdf: 488383 bytes, checksum: 40a97f3540caa6b8f6f2691c3a402579 (MD5) / Conselho Nacional de Desenvolvimento Científico e Tecnológico (CNPq) / Coordenação de Aperfeiçoamento de Pessoal de Nível Superior (CAPES) / Sistemas dinâmicos híbridos se diferenciam por exibir simultaneamente variados tipos de comportamento dinâmico (contínuo, discreto, eventos discretos) em diferentes partes do sistema. Neste trabalho foram estudados resultados de estabilidade no sentido de Lyapunov para sistemas dinâmicos híbridos gerais, que utilizam uma noção de tempo generalizado, definido em um espaço métrico totalmente ordenado. Mostrou-se que estes sistemas podem ser imersos em sistemas dinâmicos descontínuos definidos em R+, de forma que sejam preservadas suas propriedades qualitativas. Como foco principal, estudou-se resultados de estabilidade para sistemas dinâmicos descontínuos modelados por semigrupos de operadores, em que os estados do sistema pertencem à espaços de Banach. Neste caso, de forma alternativa à teoria clássica de estabilidade, os resultados não utilizam as usuais funções de Lyapunov, sendo portanto mais fáceis de se aplicar, tendo em vista a dificuldade em se encontrar tais funções para muitos sistemas. Além disso, os resultados foram aplicados à uma classe de equações diferenciais com retardo. / Hybrid dynamical systems are characterized for showing simultaneously a variety of dynamic behaviors (continuous, discrete, discrete events) in different parts of the System. This work discusses stability results in the Lyapunov sense for general hybrid dynamical systems that use a generalized notion of time, defined in a completely ordered metric space. It has been shown that these systems may be immersed in discontinuous dynamical systems defined in R+, so that their quality properties are preserved. As the main focus, it is studied stability results for discontinuous dynamical systems modeled by semigroup operators, in which the states belong to Banach spaces. In this case, an alternative to the classical theory of stability, the results do not make use of the usual Lyapunov functions, and therefore are easier to apply, in view of the difficulty in finding such functions for many systems. Furthermore, the results were applied to a class of time-delay discontinuous differential equations. Sistemas dinâmicos diferenciais Semigrupos Análise de estabilidade Sistemas dinâmicos descontínuos Sistemas dinâmicos Hybrid dynamical systems Discontinuous dynamical systems Semigroup Lyapunov stability Functional differential equations Embedding mappin
110	A Teoria de Semigrupo aplicada às equações diferenciais parciais. / The Semigroup Theory applied to partial differential equations. MELO, Romero Alves de. 10 July 2018 (has links) Submitted by Johnny Rodrigues (johnnyrodrigues@ufcg.edu.br) on 2018-07-10T18:13:32Z No. of bitstreams: 1 ROMERO ALVES DE MELO - DISSERTAÇÃO PPGMAT 2006..pdf: 1038740 bytes, checksum: d9fd10d289c6cf822fe688e743b58356 (MD5) / Made available in DSpace on 2018-07-10T18:13:32Z (GMT). No. of bitstreams: 1 ROMERO ALVES DE MELO - DISSERTAÇÃO PPGMAT 2006..pdf: 1038740 bytes, checksum: d9fd10d289c6cf822fe688e743b58356 (MD5) Previous issue date: 2006-12 / Capes / Neste trabalho usaremos a Teoria de Semigrupos para demonstrar resultados de existência e unicidade de solução para Equações Diferenciais Ordinárias, em espaços de Banach. Usando esta teoria resolvemos problemas de valor inicial, com relação a equação do calor e a equação da onda. (Para visualizar a equação ou fórmula deste resumo recomendamos o download do arquivo). / In this work we use semigroup theory to prove some results of existence and unicity for a class Ordinary Diﬀerential Equation, on Banach spaces. Using this tool, we show the existence of solutions for wave and heat equations. (To visualize the equation or formula of this summary we recommend downloading the file). Matemática. Teoria de semigrupo Equações diferenciais parciais Equações diferenciais ordinárias Operador Linear Ilimitado Teorema de Hille-Yosida Semigrupo analítico Cálculo em espaços de Banach Partial differential equations Analytical semigroup Linear Operator Unlimited

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