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451	Ideais diferenciais em álgebras finitamente geradas / Differential ideals in finitely generated algebras Luan Benzi Medeiros 18 May 2018 (has links) O objetivo principal dessa dissertação é o estudo do comportamento de ideais diferenciais com respeito à importantes temas de álgebra comutativa como decomposição primária e localização. Veremos que dado um ideal diferencial em um anel noetheriano de característica zero, seus primos associados também serão diferenciais e que ele admite uma decomposição primária cujas componentes são diferenciais. Em relação a localização, teremos uma equivalência dos conceitos de ideais diferenciais no anel dado e no localizado, ou seja, um ideal é diferencial se, e somente se, sua localização também o é. / The main goal of this dissertation is to study the behavior of differential ideals regarding important themes of commutative algebra such as primary decomposition and localization. We will see that, given a differential ideal in a noetherian ring of caracteristic zero, its associated primes ideals will also be differentials and we will exhibit a primary decomposition whose components will be differentials too. In relation to localization, we will have an equivalence of the concepts of differential ideals in the given ring and in the localized ring, that is, an ideal is differential if, and only if, its localization is differential too. Álgebras Ideais diferenciais Algebras Differential ideals
452	Conditional and approximate symmetries for nonlinear partial differential equations Kohler, Astri 21 July 2014 (has links) M.Sc. / In this work we concentrate on two generalizations of Lie symmetries namely conditional symmetries in the form of Q-symmetries and approximate symmetries. The theorems and definitions presented can be used to obtain exact and approximate solutions for nonlinear partial differential equations. These are then applied to various nonlinear heat and wave equations and many interesting solutions are given. Chapters 1 and 2 gives an introduction to the classical Lie approach. Chapters 3, 4 and 5 deals with conditional -, approximate -, and approximate conditional symmetries respectively. In chapter 6 we give a review of symbolic algebra computer packages available to aid in the search for symmetries, as well as useful REDUCE programs which were written to obtain the results given in chapters 2 to 5. Lie algebras Symmetry Differential equations, Nonlinear
453	Cuts, discontinuities and the coproduct of Feynman diagrams Souto Gonçalves De Abreu, Samuel François January 2015 (has links) We study the relations among unitarity cuts of a Feynman integral computed via diagrammatic cutting rules, the discontinuity across the corresponding branch cut, and the coproduct of the integral. For single unitarity cuts, these relations are familiar, and we show that they can be generalized to cuts in internal masses and sequences of cuts in different channels and/or internal masses. We develop techniques for computing the cuts of Feynman integrals in real kinematics. Using concrete one- and two-loop scalar integral examples we demonstrate that it is possible to reconstruct a Feynman integral from either single or double unitarity cuts. We then formulate a new set of complex kinematics cutting rules generalising the ones defined in real kinematics, which allows us to define and compute cuts of general one-loop graphs, with any number of cut propagators. With these rules, which are consistent with the complex kinematic cuts used in the framework of generalised unitarity, we can describe more of the analytic structure of Feynman diagrams. We use them to compute new results for maximal cuts of box diagrams with different mass configurations as well as the maximal cut of the massless pentagon. Finally, we construct a purely graphical coproduct of one-loop scalar Feynman diagrams. In this construction, the only ingredients are the diagram under consideration, the diagrams obtained by contracting some of its propagators, and the diagram itself with some of its propagators cut. Using our new definition of cut, we map the graphical coproduct to the coproduct acting on the functions Feynman diagrams and their cuts evaluate to. We finish by examining the consequences of the graphical coproduct in the study of discontinuities and differential equations of Feynman integrals. 530.14
454	Continuity of generalized inverses in Banach algebras Behrendt, Darren Robin 24 January 2012 (has links) M.Sc. Banach algebras Generalized inverses Linear operators
455	On the role of subharmonic functions in the spectral theory of general Banach algebras Moolman, Ruan 23 February 2010 (has links) M.Sc. Banach algebras Spectral theory (Mathematics) Algebraic functions
456	Some problems in algebraic topology Wood, Reginald January 1964 (has links) No description available.
457	On the use of Cayley determinants in the scattering theory of elementary particles Melrose, D. B. January 1965 (has links) No description available.
458	Some quantum mechanical applications of the theory of Lie algebras Wollenberg, L. S. January 1967 (has links) No description available.
459	Riesz theory and Fredholm determinants in Banach algebras Bapela, Manas Majakwane 04 December 2006 (has links) In the classical theory of operators on a Banach space a beautiful interplay exists between Riesz and Fredholm theory, and the theory of traces and de¬terminants for operator ideals. In this thesis we obtain a complete Riesz de¬composition theorem for Riesz elements in a semi prime Banach algebra and on the other hand extend the existing theory of traces and determinants to a more general setting of Banach algebras. In order to obtain some of these results we use the notion of finite multiplicity of spectral points to give a characterization of the essential spec¬trum for elements in a Banach algebra. As an immediate corollary we obtain the well-known characterization of Riesz elements namely that their non-zero spectral points are isolated and of finite multiplicities. In the final chapter of the thesis we use Plemelj's type formulas to define a determinant on the ideal of finite rank elements and show that it extends continuously to the ideal of nuclear elements. / Thesis (PhD (Mathematics))--University of Pretoria, 2006. / Mathematics and Applied Mathematics / unrestricted Operator algebras Linear algebraic groups UCTD
460	Actions of Finite Groups on Substitution Tilings and Their Associated C-algebras Starling, Charles B* January 2012 (has links) The goal of this thesis is to examine the actions of finite symmetry groups on aperiodic tilings. To an aperiodic tiling with finite local complexity arising from a primitive substitution rule one can associate a metric space, transformation groupoids, and C-algebras. Finite symmetry groups of the tiling act on each of these objects and we investigate appropriate constructions on each, namely the orbit space, semidirect product groupoids, and crossed product C-algebras respectively. Of particular interest are the crossed product C*-algebras; we derive important structure results about them and compute their K-theory. Tilings Operator Algebras K-theory Noncommutative Geometry

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