Géométrie combinatoire des fractions rationnelles / Combinatorial geometry of rational functions

Tomasini, Jérôme

05 December 2014

Le but de cette thèse est d’étudier, à l’aide d’outils combinatoires simples, différentes structures géométriques construites à partir de l’action d’un polynôme ou d’une fraction rationnelle. Nous considérerons d’abord la structure de l'ensemble des solutions séparatrices d’un champ de vecteurs polynomial ou rationnel. Nous allons établir plusieurs modèles combinatoires de ces cartes planaires, ainsi qu’une formule fermée énumérant les différentes structures topologiques dans le cas polynomial. Puis nous parlerons de revêtements ramifiés de la sphère que nous modéliserons, via un objet combinatoire nommée carte équilibrée, à partir d’une idée originale de W.Thurston. Ce modèle nous permettra de démontrer (géométriquement) de nombreuses propriétés de ces objets, et d’offrir une nouvelle approche et de nouvelles perspectives au problème d’Hurwitz, qui reste encore aujourd’hui un problème ouvert. Et enfin nous aborderons le sujet de la dynamique holomorphe via les primitives majeures dont l’utilité est de permettre de paramétrer les systèmes dynamiques engendrés par l’itération de polynômes. Cette approche nous permettra de construire une bijection entre les suites de parking et les arbres de Cayley, ainsi que d’établir une formule fermée liée à l’énumération d’un certain type d’arbres relié à la fois aux primitives majeures et aux revêtements ramifiés polynomiaux. / The main topic of this thesis is to study, thanks to simple combinatorial tools, various geometric structures coming from the action of a complex polynomial or a rational function on the sphere. The first structure concerns separatrix solutions of polynomial or rational vector fields. We will establish several combinatorial models of these planar maps, as well as a closed formula enumerating the different topological structures that arise in the polynomial settings. Then, we will focus on branched coverings of the sphere. We establish a combinatorial coding of these mappings using the concept of balanced maps, following an original idea of W. Thurston. This combinatorics allows us to prove (geometrically) several properties about branched coverings, and gives us a new approach and perspective to address the still open Hurwitz problem. Finally, we discuss a dynamical problem represented by primitive majors. The utility of these objects is to allow us to parameterize dynamical systems generated by the iterations of polynomials. This approach will enable us to construct a bijection between parking functions and Cayley trees, and to establish a closed formula enumerating a certain type of trees related to both primitive majors and polynomial branched coverings.

Fraction rationnelle

Revêtement ramifié

Carte équilibrée

Problème de Hurwitz

Primitive majeure

Carte planaire

Dynamical systems

Primitive majors

Balanced maps

Hurwitz problem

Branched coverings

Planar maps

Rational functions

Vector fields

510

On an ODE Associated to the Ricci Flow

Bhattacharya, Atreyee

January 2013

We discuss two topics in this talk. First we study compact Ricci-flat four dimensional manifolds without boundary and obtain point wise restrictions on curvature( not involving global quantities such as volume and diameter) which force the metric to be flat. We obtain the same conclusion for compact Ricci-flat K¨ahler surfaces with similar but weaker restrictions on holomorphic sectional curvature. Next we study the reaction ODE associated to the evolution of the Riemann curvature operator along the Ricci flow. We analyze the behavior of this ODE near algebraic curvature operators of certain special type that includes the Riemann curvature operators of various(locally) symmetric spaces. We explicitly show the existence of some solution curves to the ODE connecting the curvature operators of certain symmetric spaces. Although the results of these two themes are different, the underlying common feature is the reaction ODE which plays an important role in both.

Riemannian Manifolds

Curvature

Ricci Flow

Ricci-Flat 4-Manifolds

Algebraic Curvature Operators

Vector Fields

Ricci-Flat Kahler Surfaces

Riemannian Curvature Operator

Kahler Manifolds

Ordinary Differential Equations

Differential Geometry

Integral Curves

Geometry

Campos de vetores suaves por partes : aspectos teóricos e aplicações /

Gonçalves, Luiz Fernando

January 2020

Orientador: Tiago de Carvalho / Resumo: Nesta tese abordaremos aspectos qualitativos e dinâmicos de problemas envolvendo campos de vetores suaves por partes, também conhecidos como campos descontínuos. Primeiramente, apresentamos aplicações da teoria de campos de vetores descontínuos em modelos de tratamento intermitente de Câncer e Vírus da Imunodeficiência Humana onde exibimos a existência de singularidades típicas e órbitas periódicas. Ainda no contexto de aplicações, revisitamos um modelo predador-presa descontínuo de modo a concluir que o mesmo tem um comportamento caótico através da existência de uma órbita de Shilnikov. Posteriormente, respondemos questões sobre existência de conjuntos minimais e caóticos para campos de vetores descontínuos na esfera bidimensional. Em seguida, partimos ao estudo de bifurcação de ciclos limites em campos de vetores descontínuos tri e bidimensionais. No primeiro caso, perturbamos um campo descontínuo tangente a uma folheação por toros de modo a gerar uma quantidade finita ou infinita de ciclos limites. No segundo caso, estudamos uma família de campos descontínuos apresentando uma dobra-dobra invisível de costura, sua ciclicidade e a relação entre os coeficientes de Lyapunov desta família e sua regularização. Além disso, estudamos campos vetoriais suaves por partes Hamiltonianos contendo uma dobra-dobra invisível de costura donde apresentamos uma fórmula explícita para o cálculo dos cinco primeiros coeficientes de Lyapunov, além de explorar os diagramas de bifurcação gerados pe... (Resumo completo, clicar acesso eletrônico abaixo) / Abstract: In this work we discuss qualitative and dynamic features of problems involving piecewise smooth vector fields, also known as discontinuous vector fields. Firstly, we present applications of discontinuous vector field theory in Human Immunodeficiency Virus and Cancer intermittent treatment models where we exhibit typical singularities and periodic orbits. Moreover, we revisit a discontinuous predator-prey model in order to conclude that it has a chaotic behavior through the existence of a Shilnikov orbit. Next, we answer questions about the existence of minimal and chaotic sets in the bidimensional sphere for discontinuous vector fields. Subsequently, we investigate the creation of limit cycles in three and two-dimensional discontinuous vector fields. In the first case, we perturb a discontinuous vector field tangent to a foliation composed by topological nested tori to generate a finite or infinite number of limit cycles. In the second case, we analyze a family of discontinuous vector fields containing a crossing invisible fold-fold, their cyclicity and the relation between the Lyapunov coefficients of this family and their regularization. Also, we study general piecewise Hamiltonian vector fields presenting a crossing invisible fold-fold where we give an explicit formula for the computation of the five first Lyapunov coefficients in addition to the investigation of the bifurcation diagrams. / Doutor

Campos de vetores suaves por partes

Singularidades típicas

Conjuntos minimais e caóticos

Ciclos limite

Coeficientes de Lyapunov

Órbita de Shilnikov

Piecewise smooth vector fields

Typical singularities

Minimal and chaotic sets

Limit cycles

Lyapunov coefficients

Shilnikov orbit

Sur la conjecture de Green-Griffiths logarithmique / On the logarithmic Green-Griffiths conjecture

Darondeau, Lionel

03 July 2014

L'objet d'étude de ce mémoire est la géométrie des courbes holomorphes entières à valeurs dans le complémentaire d'hypersurfaces génériques de l'espace projectif complexe. Les conjectures célèbres de Kobayashi et de Green-Griffiths énoncent que pour de telles hypersurfaces, de grand degré, les images de ces courbes entières doivent satisfaire certaines contraintes algébriques. En adaptant les techniques de jets développées notamment par Bloch, Green-Griffiths, Demailly, Siu, Diverio-Merker-Rousseau, pour les courbes à valeurs dans une hypersurface projective (cas dit compact), nous obtenons la dégénérescence algébrique des courbes entières f : ℂ→Pⁿ∖Xd (cas dit logarithmique), pour les hypersurfaces génériques Xd de Pⁿ de degré d ≥ (5n)² nⁿ. Comme dans le cas compact, notre preuve repose essentiellement sur l'élimination algébrique de toutes les dérivées dans des équations différentielles qui sont vérifiées par toute courbe entière non constante. L'existence de telles équations différentielles est obtenue grâce aux inégalités de Morse holomorphes et à une variante simplifiée d'une formule de résidus originalement élaborée par Bérczi à partir de la formule de localisation équivariante d'Atiyah-Bott. La borne effective d ≥ (5n)² nⁿ est obtenue par réduction radicale d'un calcul de résidus itérés de très grande ampleur. Ensuite, la déformation de ces équations différentielles par dérivation le long de champs de vecteurs obliques, dont l'existence est ici généralisée et clarifiée, nous permet d'engendrer suffisamment de nouvelles équations pour réaliser l'élimination algébrique finale évoquée ci-dessus. / The topic of this memoir is the geometry of holomorphic entire curves with values in the complement of generic hypersurfaces of the complex projective space. The well-known conjectures of Kobayashi and of Green-Griffiths assert that for such hypersurfaces, having large degree, the images of these curves shall fulfill algebraic constraints. By adapting the jet techniques developed notably by Bloch, Green-Griffiths, Demailly, Siu, Diverio-Merker-Rousseau, in the case of curves with values in projective hypersurfaces (so-called compact case), we obtain the algebraic degeneracy of entire curves f : ℂ→Pⁿ∖Xd (so called logarithmic case), for generic hypersurfaces Xd in Pⁿ of degree d ≥ (5n)² nⁿ. As in the compact case, our proof essentially relies on the algebraic elimination of all derivatives in differential equations that are satisfied by every nonconstant entire curve. The existence of such differential equations is obtained thanks to the holomorphic Morse inequalities and a simplified variant of a residue formula firstly developed by Bérczi from the Atiyah-Bott equivariant localization formula. The effective lower bound d ≥ (5n)² nⁿ is obtained by radically simplifying a huge iterated residue computation. Next, the deformation of these differential equations by derivation along slanted vector fields, the existence of which is here generalized and clarified, allows us to generate sufficiently many new differential equations in order to realize the final algebraic elimination mentioned above.

Hyperbolicité

Positivité

Conjecture de Green-Griffiths

Hypersurface projective

Jets logarithmiques

Inégalités de Morse holomorphes

Classes de Segre

Résidus itérés

Hypersurface universelle

Champs de vecteurs obliques

Hyperbolicity

Positivity

Green-Griffiths conjecture

Projective hypersurface

Logarithmic jets

Algebraic Morse inequalities

Segre classes

Iterated residues

Universal hypersurface

Slanted vector fields

Cohomologies on sympletic quotients of locally Euclidean Frolicher spaces

Tshilombo, Mukinayi Hermenegilde

08 1900

This thesis deals with cohomologies on the symplectic quotient of a Frölicher space which is locally diffeomorphic to a Euclidean Frölicher subspace of Rn of constant dimension equal to n. The symplectic reduction under consideration in this thesis is an extension of the Marsden-Weinstein quotient (also called, the reduced space) well-known from the finite-dimensional smooth manifold case. That is, starting with a proper and free action of a Frölicher-Lie-group on a locally Euclidean Frölicher space of finite constant dimension, we study the smooth structure and the topology induced on a small subspace of the orbit space. It is on this topological space that we will construct selected cohomologies such as : sheaf cohomology, Alexander-Spanier cohomology, singular cohomology, ~Cech cohomology and de Rham cohomology. Some natural questions that will be investigated are for instance: the impact of the symplectic structure on these di erent cohomologies; the cohomology that will give a good description of the topology on the objects of category of Frölicher spaces; the extension of the de Rham cohomology theorem in order to establish an isomorphism between the five cohomologies. Beside the algebraic, topological and geometric study of these new objects, the thesis contains a modern formalism of Hamiltonian mechanics on the reduced space under symplectic and Poisson structures. / Mathematical Sciences / D. Phil. (Mathematics)

Constant dimension

Locally Euclidean Frolicher spaces

Symplectic structure

Symplectic geometry

Symplectic quotient or reduced space

Exterior algebra

Ringed Frolicher space

Smooth Gelfand representation

Sheaf cohomology

Alexander-Spanier cohomology

Singular cohomology

Cech cohomology and de Rham cohomology

Vector fields and mechanics

514.224

Homology theory

Symplectic manifolds

Topological spaces

Sheaf theory

Geometry, Differential

Hamiltonian graph theory

Algebraic spaces

Cohomologies on sympletic quotients of locally Euclidean Frolicher spaces

Tshilombo, Mukinayi Hermenegilde

08 1900

This thesis deals with cohomologies on the symplectic quotient of a Frölicher space which is locally diffeomorphic to a Euclidean Frölicher subspace of Rn of constant dimension equal to n. The symplectic reduction under consideration in this thesis is an extension of the Marsden-Weinstein quotient (also called, the reduced space) well-known from the finite-dimensional smooth manifold case. That is, starting with a proper and free action of a Frölicher-Lie-group on a locally Euclidean Frölicher space of finite constant dimension, we study the smooth structure and the topology induced on a small subspace of the orbit space. It is on this topological space that we will construct selected cohomologies such as : sheaf cohomology, Alexander-Spanier cohomology, singular cohomology, ~Cech cohomology and de Rham cohomology. Some natural questions that will be investigated are for instance: the impact of the symplectic structure on these di erent cohomologies; the cohomology that will give a good description of the topology on the objects of category of Frölicher spaces; the extension of the de Rham cohomology theorem in order to establish an isomorphism between the five cohomologies. Beside the algebraic, topological and geometric study of these new objects, the thesis contains a modern formalism of Hamiltonian mechanics on the reduced space under symplectic and Poisson structures. / Mathematical Sciences / D. Phil. (Mathematics)

Constant dimension

Locally Euclidean Frolicher spaces

Symplectic structure

Symplectic geometry

Symplectic quotient or reduced space

Exterior algebra

Ringed Frolicher space

Smooth Gelfand representation

Sheaf cohomology

Alexander-Spanier cohomology

Singular cohomology

Cech cohomology and de Rham cohomology

Vector fields and mechanics

514.224

Homology theory

Symplectic manifolds

Topological spaces

Sheaf theory

Geometry, Differential

Hamiltonian graph theory

Algebraic spaces