Tesis sobre el tema "Differential graded Lie algebras"
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Fialowski, Alice, Michael Penkava y fialowsk@cs elte hu. "Deformation Theory of Infinity Algebras". ESI preprints, 2000. ftp://ftp.esi.ac.at/pub/Preprints/esi906.ps.
Texto completoYaseen, Hogar M. "Generalized root graded Lie algebras". Thesis, University of Leicester, 2018. http://hdl.handle.net/2381/42765.
Texto completoat, Andreas Cap@esi ac. "Graded Lie Algebras and Dynamical Systems". ESI preprints, 2001. ftp://ftp.esi.ac.at/pub/Preprints/esi1086.ps.
Texto completoYang, Qunfeng. "Some graded Lie algebra structures associated with Lie algebras and Lie algebroids". Thesis, National Library of Canada = Bibliothèque nationale du Canada, 1999. http://www.collectionscanada.ca/obj/s4/f2/dsk1/tape9/PQDD_0007/NQ41350.pdf.
Texto completoBagnoli, Lucia. "Z-graded Lie superalgebras". Master's thesis, Alma Mater Studiorum - Università di Bologna, 2017. http://amslaurea.unibo.it/14118/.
Texto completoPauksztello, David. "Homological properties of differential graded algebras". Thesis, University of Leeds, 2008. http://ethos.bl.uk/OrderDetails.do?uin=uk.bl.ethos.493288.
Texto completoShklyarov, Dmytro. "Hirzebruch-Riemann-Roch theorem for differential graded algebras". Diss., Manhattan, Kan. : Kansas State University, 2009. http://hdl.handle.net/2097/1381.
Texto completoMaycock, Daniel. "Properties of triangular matrix and Gorenstein differential graded algebras". Thesis, University of Newcastle upon Tyne, 2011. http://hdl.handle.net/10443/1359.
Texto completoChung, Myungsuk. "Lie derivations on rings of differential operators". Diss., Virginia Tech, 1995. http://hdl.handle.net/10919/37457.
Texto completoMartini, Alessio. "Algebras of differential operators on Lie groups and spectral multipliers". Doctoral thesis, Scuola Normale Superiore, 2010. http://hdl.handle.net/11384/85663.
Texto completoDolan, Peter. "A Z2-graded generalization of Kostant's version of the Bott-Borel-Weil theorem /". view abstract or download file of text, 2007. http://proquest.umi.com/pqdweb?did=1400959341&sid=2&Fmt=2&clientId=11238&RQT=309&VName=PQD.
Texto completoTypescript. Includes vita and abstract. Includes bibliographical references (leaves 130-131). Also available for download via the World Wide Web; free to University of Oregon users.
Gover, Ashwin Roderick. "A geometrical construction of conformally invariant differential operators". Thesis, University of Oxford, 1989. http://ethos.bl.uk/OrderDetails.do?uin=uk.bl.ethos.329953.
Texto completoHansen, Nils Bahne [Verfasser]. "Structure Analysis of the Pohlmeyer-Rehren Lie Algebra and Adaptations of the Hall Algorithm to Non-Free Graded Lie Algebras / Nils Bahne Hansen". Göttingen : Niedersächsische Staats- und Universitätsbibliothek Göttingen, 2021. http://d-nb.info/1236401646/34.
Texto completoLavau, Sylvain. "Lie infini-algébroides et feuilletages singuliers". Thesis, Lyon, 2016. http://www.theses.fr/2016LYSE1215/document.
Texto completoA smooth manifold is said to be foliated when it is partitioned into immersed submanifolds. Foliation Theory has profound applications in various fields of Mathematics and Physics, and it seems much more interesting to analyze the foliation from what seems to be a more fundamental point of view: its associated distribution of vector fields. Thus we have noticed that if the foliation is resolved by a graded fiber bundle, one can lift the Lie bracket of vector fields into a Lie infinity-algebroid structure on this fiber bundle. Moreover, this structure is universal in the sense that any other resolution of the foliation is isomorphic to it in the L_infinity setup, but only up to homotopy. When one restricts the analysis over a point, we observe that the cohomology associated to the resolution may become non trivial. The universal Lie infinity-algebroid structure hence reduces to a graded Lie algebra structure on this cohomology. This algebraic structure can be carried (non canonically) along the leaf, providing the cohomology over a leaf with a graded Lie algebroid structure. This enables us to retrieve former well-known results, as well as promising advances
Souza, Manuela da Silva 1985. "Propriedade de Specht e crescimento das identidades polinomiais graduadas de sl_2". [s.n.], 2013. http://repositorio.unicamp.br/jspui/handle/REPOSIP/306362.
Texto completoTese (doutorado) - Universidade Estadual de Campinas, Instituto de Matemática, Estatística e Computação Científica
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Doutorado
Matematica
Doutora em Matemática
Sánchez, Jesús. "About E-infinity-structures in L-algebras". Thesis, Sorbonne Paris Cité, 2016. http://www.theses.fr/2016USPCC204/document.
Texto completoIn this thesis we recall the notion of L-algebra. L-algebras are intended as algebraic models for homotopy types. L-algebras were introduced by Alain Prouté in several talks since the eighties. The principal objective of this thesis is the description of an E-infinity-coalgebra structure on the main element of an L-algebra. This can be seen as a generalization of the E-infinity-coalgebra structure on the chain complex associated to a simplicial set given by Smith in Iterating the cobar construction, 1994. We construct an E-inifity-operad, denoted K, used to construct the E-inifity-coalgebra on the main element of a L-algebra. This E-inifity-coalgebra structure shows that the canonical L-algebra associated to a simplicial set contains at least as much homotopy information as the E-inifity-coalgebras usually associated to simplicial sets
Sene, Renato Tolentino de. "Curvaturas de métricas invariantes em Grupos de Lie". Universidade Federal de Uberlândia, 2015. https://repositorio.ufu.br/handle/123456789/16821.
Texto completoNeste trabalho estudamos os aspectos geometricos de grupos de Lie, do ponto de vista da geometria Riemanniana, por meio de estruturas geometricas invariantes associadas. Nos apresentamos algumas propriedades de curvaturas com metricas invariante a esquerda e aquelas bi-invariantes em grupos de Lie. Apresentamos tambem um tratamento das algebras de Lie unimodulares, incluindo o caso tridimensional. A maioria dos resultados estudados foram retirados do artigo de John Milnor: Curvatures of Left Invariant Metrics on Lie Groups.
Mestre em Matemática
Webster, Benjamin. "On Representations of the Jacobi Group and Differential Equations". UNF Digital Commons, 2018. https://digitalcommons.unf.edu/etd/858.
Texto completoKunz, Daniel. "Lieovy grupy a jejich fyzikální aplikace". Master's thesis, Vysoké učení technické v Brně. Fakulta strojního inženýrství, 2020. http://www.nusl.cz/ntk/nusl-417088.
Texto completoSingh, Pranav. "High accuracy computational methods for the semiclassical Schrödinger equation". Thesis, University of Cambridge, 2018. https://www.repository.cam.ac.uk/handle/1810/274913.
Texto completoOuzina, Mostafa. "Théorème du support en théorie du filtrage non-linéaire". Rouen, 1998. http://www.theses.fr/1998ROUES029.
Texto completoRocha, Eugénio Alexandre Miguel. "Uma Abordagem Algébrica à Teoria de Controlo Não Linear". Doctoral thesis, Universidade de Aveiro, 2003. http://hdl.handle.net/10773/21444.
Texto completoNesta tese de Doutoramento desenvolve-se principalmente uma abordagem algébrica à teoria de sistemas de controlo não lineares. No entanto, outros tópicos são também estudados. Os tópicos tratados são os seguidamente enunciados: fórmulas para sistemas de controlo sobre álgebras de Lie livres, estabilidade de um sistema de corpos rolantes, algoritmos para aritmética digital, e equações integrais de Fredholm não lineares. No primeiro e principal tópico estudam-se representações para as soluções de sistemas de controlo lineares no controlo. As suas trajetórias são representadas pelas chamadas séries de Chen. Estuda-se a representação formal destas séries através da introdução de várias álgebras não associativas e técnicas específicas de álgebras de Lie livres. Sistemas de coordenadas para estes sistemas são estudados, nomeadamente, coordenadas de primeiro tipo e de segundo tipo. Apresenta-se uma demonstração alternativa para as coordenadas de segundo tipo e obtêm-se expressões explícitas para as coordenadas de primeiro tipo. Estas últimas estão intimamente ligadas ao logaritmo da série de Chen que, por sua vez, tem fortes relações com uma fórmula designada na literatura por “continuous Baker-Campbell- Hausdorff formula”. São ainda apresentadas aplicações à teoria de funções simétricas não comutativas. É, por fim, caracterizado o mapa de monodromia de um campo de vectores não linear e periódico no tempo em relação a uma truncatura do logaritmo de Chen. No segundo tópico é estudada a estabilizabilidade de um sistema de quaisquer dois corpos que rolem um sobre o outro sem deslizar ou torcer. Constroem-se controlos fechados e dependentes do tempo que tornam a origem do sistema de dois corpos num sistema localmente assimptoticamente estável. Vários exemplos e algumas implementações em Maple°c são discutidos. No terceiro tópico, em apêndice, constroem-se algoritmos para calcular o valor de várias funções fundamentais na aritmética digital, sendo possível a sua implementação em microprocessadores. São também obtidos os seus domínios de convergência. No último tópico, também em apêndice, demonstra-se a existência e unicidade de solução para uma classe de equações integrais não lineares com atraso. O atraso tem um carácter funcional, mostrando-se ainda a diferenciabilidade no sentido de Fréchet da solução em relação à função de atraso.
In this PhD thesis several subjects are studied regarding the following topics: formulas for nonlinear control systems on free Lie algebras, stabilizability of nonlinear control systems, digital arithmetic algorithms, and nonlinear Fredholm integral equations with delay. The first and principal topic is mainly related with a problem known as the continuous Baker-Campbell-Hausdorff exponents. We propose a calculus to deal with formal nonautonomous ordinary differential equations evolving on the algebra of formal series defined on an alphabet. We introduce and connect several (non)associative algebras as Lie, shuffle, zinbiel, pre-zinbiel, chronological (pre-Lie), pre-chronological, dendriform, D-I, and I-D. Most of those notions were also introduced into the universal enveloping algebra of a free Lie algebra. We study Chen series and iterated integrals by relating them with nonlinear control systems linear in control. At the heart of all the theory of Chen series resides a zinbiel and shuffle homomorphism that allows us to construct a purely formal representation of Chen series on algebras of words. It is also given a pre-zinbiel representation of the chronological exponential, introduced by A.Agrachev and R.Gamkrelidze on the context of a tool to deal with nonlinear nonautonomous ordinary differential equations over a manifold, the so-called chronological calculus. An extensive description of that calculus is made, collecting some fragmented results on several publications. It is a fundamental tool of study along the thesis. We also present an alternative demonstration of the result of H.Sussmann about coordinates of second kind using the mentioned tools. This simple and comprehensive proof shows that coordinates of second kind are exactly the image of elements of the dual basis of a Hall basis, under the above discussed homomorphism. We obtain explicit expressions for the logarithm of Chen series and the respective coordinates of first kind, by defining several operations on a forest of leaf-labelled trees. It is the same as saying that we have an explicit formula for the functional coefficients of the Lie brackets on a continuous Baker-Campbell-Hausdorff-Dynkin formula when a Hall basis is used. We apply those formulas to relate some noncommutative symmetric functions, and we also connect the monodromy map of a time-periodic nonlinear vector field with a truncation of the Chen logarithm. On the second topic, we study any system of two bodies rolling one over the other without twisting or slipping. By using the Chen logarithm expressions, the monodromy map of a flow and Lyapunov functions, we construct time-variant controls that turn the origin of a control system linear in control into a locally asymptotically stable equilibrium point. Stabilizers for control systems whose vector fields generate a nilpotent Lie algebra with degree of nilpotency · 3 are also given. Some examples are presented and Maple°c were implemented. The third topic, on appendix, concerns the construction of efficient algorithms for Digital Arithmetic, potentially for the implementation in microprocessors. The algorithms are intended for the computation of several functions as the division, square root, sines, cosines, exponential, logarithm, etc. By using redundant number representations and methods of Lyapunov stability for discrete dynamical systems, we obtain several algorithms (that can be glued together into an algorithm for parallel execution) having the same core and selection scheme in each iteration. We also prove their domains of convergence and discuss possible extensions. The last topic, also on appendix, studies the set of solutions of a class of nonlinear Fredholm integral equations with general delay. The delay is of functional character modelled by a continuous lag function. We ensure existence and uniqueness of a continuous (positive) solution of such equation. Moreover, under additional conditions, it is obtained the Fr´echet differentiability of the solution with respect to the lag function.
Gartz, Kaj M. "A construction of a differential graded Lie algebra in the category of effective homological motives /". 2003. http://gateway.proquest.com/openurl?url_ver=Z39.88-2004&res_dat=xri:pqdiss&rft_val_fmt=info:ofi/fmt:kev:mtx:dissertation&rft_dat=xri:pqdiss:3088737.
Texto completoTORTORELLA, ALFONSO GIUSEPPE. "Deformations of coisotropic submanifolds in Jacobi manifolds". Doctoral thesis, 2017. http://hdl.handle.net/2158/1077777.
Texto completoEuler, Norbert. "Continuous symmetries, lie algebras and differential equations". Thesis, 2014. http://hdl.handle.net/10210/9131.
Texto completoIn this thesis aspects of continuous symmetries of differential equations are studied. In particular the following aspects are studied in detail: Lie algebras, the Lie derivative, the jet bundle formalism for differential equations, Lie point and Lie-Backlund symmetry vector fields, recursion operators, conservation laws, Lax pairs, the Painlcve test, Lie algebra valued differenmtial forms and Dose operators as a representation of differential operators. The purpose of the study is to gain a better understanding of complicated nonlinear dirrerential equations that describe nature and to construct solutions. The differential equations under consideration were derived [rom physics and engineering. They are the following: the Kortcweg-dc Vries equation, Burgers' cquation , the sine-Gordon equation, nonlinear diffusion equations, the Klein Gordon equation, the Schrodinger equation, nonlinear Dirac equations, Yang-Mills equations, the Lorentz model, the Lotka-Volterra model, damped unharrnonic oscillators, and others. The newly found results and insights are discussed in chapters 8 to 17. Details on the COli tents of each chapter and rcfernces to some of my articles arc given in chapter 1.
Donin, Dmitry. "Lie Algebras of Differential Operators and D-modules". Thesis, 2008. http://hdl.handle.net/1807/16779.
Texto completoPASQUALI, MARCO. "On the structure of Borel stable abelian subalgebras in Z2-graded Lie algebras". Doctoral thesis, 2012. http://hdl.handle.net/11573/917818.
Texto completoKara, A. H. "On lie and Noether symmetries of differential equations". Thesis, 1994. https://hdl.handle.net/10539/26093.
Texto completoThe inverse problem in the Calculus of Variations involves determining the Lagrangians, if any, associated with a given (system of) differential equation(s). One can classify Lagrangians according to the Lie algebra of symmetries of the Action integral (the Noether algebra). We give a complete classification of first-order Lagrangians defined on the line and produce results pertaining to the dimensionality of the algebra of Noether symmetries and compare and contrast these with similar results on the algebra of Lie symmetries of the corresponding Euler-Lagrange .equations. It is proved that the maximum dimension of the Noether point symmetry algebra of a particle Lagrangian. is five whereas it is known that the maximum dimension Qf the Lie algebra of the corresponding scalar second-order Euler-Lagrange equation is eight. Moreover, we show th'a.t a particle Lagrangian does not admit a maximal four-dimensional Noether point symmeiry algebra and consequently a particle Lagrangian admits the maximal r E {O, 1,2,3, 5}-dimensional Noether point symmetry algebra, It is well .known that an important means of analyzing differential equations lies in the knowledge of the first integrals of the equation. We deliver an algorithm for finding first integrals of partial differential equations and show how some of the symmetry properties of the first integrals help to 'further' reduce the order of the equations and sometimes completely solve the equations. Finally, we discuss some open questions. These include the inverse problem and classification of partial differential equations. ALo, there is the question of the extension of the results to 'higher' dimensions.
Andrew Chakane 2018
Wills, Luis Alberto. "Finite group graded lie algebraic extensions and trefoil symmetric relativity, standard model, yang mills and gravity theories". Thesis, 2008. http://hdl.handle.net/10125/11725.
Texto completoThesis (Ph. D.)--University of Hawaii at Manoa, 2004.
Includes bibliographical references (leaves 159-164).
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Schmidt, Karsten [Verfasser]. "Auslander-Reiten theory for simply connected differential graded algebras / vorgelegt von Karsten Schmidt". 2007. http://d-nb.info/987425641/34.
Texto completoBhargava, Sandeep. "Realizations of BC(r)-graded intersection matrix algebras with grading subalgebras of type B(r), r greater than or equal to 3 /". 2008. http://gateway.proquest.com/openurl?url_ver=Z39.88-2004&res_dat=xri:pqdiss&rft_val_fmt=info:ofi/fmt:kev:mtx:dissertation&rft_dat=xri:pqdiss:NR45986.
Texto completoTypescript. Includes bibliographical references (leaves 275-278). Also available on the Internet. MODE OF ACCESS via web browser by entering the following URL: http://gateway.proquest.com/openurl?url_ver=Z39.88-2004&res_dat=xri:pqdiss&rft_val_fmt=info:ofi/fmt:kev:mtx:dissertation&rft_dat=xri:pqdiss:NR45986
"Applications of symmetry analysis to physically relevant differential equations". Thesis, 2005. http://hdl.handle.net/10413/2546.
Texto completoThesis (M.Sc.)-University of KwaZulu-Natal, Durban, 2005.
Kohler, Astri. "Conditional and approximate symmetries for nonlinear partial differential equations". Thesis, 2014. http://hdl.handle.net/10210/11449.
Texto completoIn 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.
Batistelli, Karina Haydeé. "Subálgebras de álgebra de Lie de operadores pseudo-diferenciales matriciales cuánticos y representaciones de módulos de peso máximo cuasifinitos de subálgebras de tipo ortogonal y simpléticos". Doctoral thesis, 2017. http://hdl.handle.net/11086/5845.
Texto completoMahomed, Komal Shahzadi. "Symmetry properties for first integrals". Thesis, 2015. http://hdl.handle.net/10539/16838.
Texto completoThis is the study of Lie algebraic properties of first integrals of scalar second-, third and higher-order ordinary differential equations (ODEs). The Lie algebraic classification of such differential equations is now well-known from the works of Lie [10] as well as recently Mahomed and Leach [19]. However, the algebraic properties of first integrals are not known except in the maximal cases for the basic first integrals and some of their quotients. Here our intention is to investigate the complete problem for scalar second-order and maximal symmetry classes of higher-order ODEs using Lie algebras and Lie symmetry methods. We invoke the realizations of low-dimensional Lie algebras. Symmetries of the fundamental first integrals for scalar second-order ODEs which are linear or linearizable by point transformations have already been obtained. Firstly we show how one can determine the relationship between the point symmetries and the first integrals of linear or linearizable scalar ODEs of order two. Secondly, a complete classi cation of point symmetries of first integrals of such linear ODEs is studied. As a consequence, we provide a counting theorem for the point symmetries of first integrals of scalar linearizable second-order ODEs. We show that there exists the 0, 1, 2 or 3 point symmetry cases. It is proved that the maximal algebra case is unique. By use of Lie symmetry group methods we further analyze the relationship between the first integrals of the simplest linear third-order ODEs and their point symmetries. It is well-known that there are three classes of linear third-order ODEs for maximal and submaximal cases of point symmetries which are 4, 5 and 7. The simplest scalar linear third-order equation has seven point symmetries. We obtain the classifying relation between the symmetry and the first integral for the simplest equation. It is shown that the maximal Lie algebra of a first integral for the simplest equation y000 = 0 is unique and four-dimensional. Moreover, we show that the Lie algebra of the simplest linear third-order equation is generated by the symmetries of the two basic integrals. We also obtain counting theorems of the symmetry properties of the first integrals for such linear third-order ODEs of maximal type. Furthermore, we provide insights into the manner in which one can generate the full Lie algebra of higher-order ODEs of maximal symmetry from two of their basic integrals. The relationship between rst integrals of sub-maximal linearizable third-order ODEs and their symmetries are investigated as well. All scalar linearizable third-order equations can be reduced to three classes by point transformations. We obtain the classifying relations between the symmetries and the first integral for sub-maximal cases of linear third-order ODEs. It is known, from the above, that the maximum Lie algebra of the first integral is achieved for the simplest equation. We show that for the other two classes they are not unique. We also obtain counting theorems of the symmetry properties of the rst integrals for these classes of linear third-order ODEs. For the 5 symmetry class of linear third-order ODEs, the first integrals can have 0, 1, 2 and 3 symmetries and for the 4 symmetry class of linear third-order ODEs they are 0, 1 and 2 symmetries respectively. In the case of sub-maximal linear higher-order ODEs, we show that their full Lie algebras can be generated by the subalgebras of certain basic integrals. For the n+2 symmetry class, the symmetries of the rst integral I2 and a two-dimensional subalgebra of I1 generate the symmetry algebra and for the n + 1 symmetry class, the full algebra is generated by the symmetries of I1 and a two-dimensional subalgebra of the quotient I3=I2. Finally, we completely classify the first integrals of scalar nonlinear second-order ODEs in terms of their Lie point symmetries. This is performed by first obtaining the classifying relations between point symmetries and first integrals of scalar nonlinear second order equations which admit 1, 2 and 3 point symmetries. We show that the maximum number of symmetries admitted by any first integral of a scalar second-order nonlinear (which is not linearizable by point transformation) ODE is one which in turn provides reduction to quadratures of the underlying dynamical equation. We provide physical examples of the generalized Emden-Fowler, Lane-Emden and modi ed Emden equations.
Leach, Peter Gavin Lawrence. "Algebraic properties of ordinary differential equations". Thesis, 1995. http://hdl.handle.net/10413/4897.
Texto completoThesis (Ph.D.)-University of Natal, 1995.
Moyo, Sibusiso. "Noether's theorem and first integrals of ordinary differential equations". Thesis, 1997. http://hdl.handle.net/10413/5061.
Texto completoThesis (M.Sc.)-University of Natal, Durban, 1997.
Bashe, Mantombi Beryl. "Equivalence and symmetry groups of a nonlinear equation in plasma physics". Thesis, 2016. http://hdl.handle.net/10539/20598.
Texto completoIn this work we give a brief overview of the existing group classification methods of partial differential equations by means of examples. On top of these methods we introduce another new method which classify according to low-dimensional Lie elgebras, One can ask: What is the aim of introducing a new method whilst there are existing methods? This question is answered in the following paragraph. Firstly we classify our system of non-linear partial differential equations using the preliminary group classification method (one of the existing methods). The results are not different from what; Euler, Steeb and Mulsor have obtained in 1991 and 1992. That is, this method does not yield new information. This new method which classifies according to low-dimensional Lie algebras is used to classify a general system of equations from plasma physics. Finally, using this method we completely classify our system for four-dimensionnl algebras. For a partial differential equation to be completely classified using this method, it must admit a low-dimensional Lie algebra.
Govinder, Kesh S. "Ermakov systems : a group theoretic approach". Thesis, 1993. http://hdl.handle.net/10413/5951.
Texto completoThesis (M.Sc.)-University of Natal, 1993.
Adams, Conny Molatlhegi. "A Lie symmetry analysis of the heat equation through modified one-parameter local point transformation". Diss., 2014. http://hdl.handle.net/10500/18414.
Texto completoApplied Mathematics
M.Sc. (Applied Mathematics)
Pantazi, Hara. "First integrals for the Bianchi universes : supplementation of the Noetherian integrals with first integrals obtained by using Lie symmetries". 1997. http://hdl.handle.net/10413/5103.
Texto completoLemmer, Ryan Lee. "The paradigms of mechanics : a symmetry based approach". Thesis, 1996. http://hdl.handle.net/10413/4899.
Texto completoThesis (M.Sc.)-University of Natal, 1996.
Edelstein, R. M. "A classification of second order equations via nonlocal transformations". Thesis, 2000. http://hdl.handle.net/10413/3694.
Texto completoThesis (M.Sc.)-University of Natal, Durban, 2000.
Ewert, Eske Ellen. "Index theory and groupoids for filtered manifolds". Doctoral thesis, 2020. http://hdl.handle.net/21.11130/00-1735-0000-0005-152D-2.
Texto completoMoas, Ruth Paola. "La energía de las secciones unitarias normales de la grassmanniana asociadas a productos cruz". Doctoral thesis, 2020. http://hdl.handle.net/11086/19767.
Texto completoSea G(k,n) la grassmanniana de subespacios orientados de Rn de dimensión k con su métrica riemanniana canónica. Estudiamos la energía de funciones que asignan a cada P en G(k,n) un vector unitario normal a P. Son secciones de un fibrado esférico E(k,n) sobre G(k,n). Los productos cruz doble y triple octoniónicos inducen de manera natural secciones de este tipo para k=2, n=7 y k=3, n=8, respectivamente. Probamos que son aplicaciones armónicas en E(k,n) munido de la métrica de Sasaki. Esto, junto con el resultado bien conocido de que los campos vectoriales de Hopf en esferas de dimensión impar son aplicaciones armónicas en su fibrado tangente unitario, nos permite concluir que todas las secciones normales unitarias de las grassmannianas asociadas a productos cruz son aplicaciones armónicas. También mostramos que estos fibrados esféricos no poseen secciones paralelas, que trivialmente habrían tenido energía mínima. En una segunda instancia analizamos la energía de aplicaciones que asignan a cada P en G(2,8) una estructura compleja ortogonal J(P) en el subespacio ortogonal a P. Estas asignaciones son secciones del subfibrado esférico unitario del fibrado vectorial sobre P en G(2,8) cuya fibra en cada P consiste esencialmente de las transformaciones antisimétricas del subespacio ortogonal a P. Probamos que la sección naturalmente inducida por el producto cruz triple octoniónico es una aplicación armónica. Comentamos la relación con la armonicidad de la estructura casi compleja canónica de la esfera de dimensión 6.
Let G(k,n) be the Grassmannian of oriented subspaces of Rn of dimension k with its canonical symmetric Riemannian metric. We study the energy of maps assigning a unit vector normal to P to each P in G(k,n) . They are sections of a sphere bundle E(k,n) over G(k,n). The octonionic double and triple cross products induce in a natural way such sections for k=2, n=7 and k=3, n=8, respectively. We prove that they are harmonic maps into E(k,n) endowed with the Sasaki metric. This, together with the well-known result that Hopf vector fields on odd dimensional spheres are harmonic maps into their unit tangent bundles, allows us to conclude that all unit normal sections of the Grassmannians associated with cross products are harmonic. We also show that these sphere bundles do not have parallel sections, which trivially would have had minimum energy. In a second instance we analyze the energy of maps assigning an orthogonal complex structure J(P) on P to each P in G(2,8). They are sections of the unit sphere bundle over G(2,8) whose fiber at each P consists essentially of the skewsymmetric transformations on P?. We prove that the section naturally induced by the octonionic triple product is a harmonic map. We comment on the relationship with the harmonicity of the canonical almost complex structure of the sphere of dimension 6.
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Fil: Moas, Ruth Paola. Universidad Nacional de Córdoba. Facultad de Matemática, Astronomía, Física y Computación; Argentina.