Height of cycles in toric varieties / Hauteur de cycles de variétés toriques

Gualdi, Roberto

20 September 2018

Nous étudions dans cette thése la relation entre certaines hauteurs d'Arakelov de cycles de variétés toriques et les caractéristiques arithmétiques des polynômes de Laurent qui les définissent. Pour cela, nous associons _a un polynôme de Laurent des fonctions concaves que nous appelons fonctions de Ronkin et fonctions supérieures. Nous donnons des bornes supérieures pour la hauteur d'une intersection compléte faisant intervenir les fonctions supérieures associées. Dans le cas d'une hypersurface, nous montrons une formule liant sa hauteur _a la fonction de Ronkin de son polynôme de Laurent. Nous proposons une égalité analogue pour des hauteurs moyennes appropriées en codimension supérieure et nous indiquons une stratégie pour la preuve d'un cas particulier. Dans ces travaux, nous utilisons des notions de géométrie convexe telles que les polytopes, les mesures de Monge-Ampére réelles et la dualité de Legendre- Fenchel de fonctions concaves. Nous les présentons dans un cadre algébrique adapté et nous développons l'étude des intégrales mixtes. / We investigate in this work the relation between suitable Arakelov heights of a cycle in a toric variety and the arithmetic features of its defining Laurent polynomials. To this purpose, we associate to a Laurent polynomial certain concave functions which we call Ronkin functions and upper functions. We give upper bounds for the height of a complete intersection in terms of the associated upper functions. For a hypersurfaces, we prove a formula relating its height to the Ronkin function of the associated Laurent polynomial. We conjecture an analogous equality for a suitable average height in higher codimensions and indicate a strategy for the proof of a particular case. In all the treatment, we deal with convex geometrical objects such as polytopes, real Monge-Ampère measures and Legendre-Fenchel duality of concave functions. We suggest an algebraic framework for such a study and deepen the understanding of mixed integrals.

Hauteurs

Variétés toriques

Géométrie d'Arakelov

Fonctions de Ronkin

Intégrale mixte

Heights

Toric varieties

Arakelov geometry

Ronkin functions

Mixed integral

Método Kernel Polinomial aplicado a uma rede de spins em ambiente correlacionado / KERNEL POLYNOMIAL METHOD APPLIED TO A NETWORK OF SPINS IN CORRELATED ENVIRONMENT.

Almeida, Guilherme Martins Alves de

10 February 2012

Coordenação de Aperfeiçoamento de Pessoal de Nível Superior / Quantum bits, or qubits, are highly fragile due to interactions with the environment. The search for good protocols for protecting quantum information from decoherence is mandatory in order to make large-scale quantum computation possible. Most of the models proposed for this assume that correlations in the environment do not exist. Correlations can induce a time dependent error probability thus seriously damaging the quantum information over the time even if a quantum correction code is avaliable. In this way, we must taking into consideration possible physical limitations to fault-tolerant quantum computing. In this work we apply the Kernel Polynomial Method (KPM) to evaluate the density of states and fidelity decay of a L = 3 toric code without taking the lattice spin dynamics into account. The Hamiltonian model is based in a free bosonic environment and a spin-boson coupling, with two decoherence channels X and Z. A long-range, anisotropic interaction between spin pairs is then proposed as a correlated model. This correlation is directly related to the interaction strengh and range between spins. We show that the fidelity decay time scale depends on these parameters. / Os bits quânticos, ou qubits, são altamente sensíveis a interações com o ambiente. O estudo de protocolos visando proteger a informação quântica da descoerência é essencial para a implementação da computação quântica em larga escala. Boa parte dos modelos propostos para esta finalidade assume as correlações no ambiente como inexistentes. Estas podem induzir uma dependência temporal na probabilidade de erro, comprometendo efetivamente a confiabilidade da informação quântica ao longo do tempo, mesmo na presença de um código de correção. Sendo assim, devemos levar em consideração possíveis limitações físicas na computação quântica tolerante a falhas. Neste trabalho aplicamos o Método Kernel Polinomial (KPM) no cálculo da densidade de estados e do decaimento da fidelidade para o código tórico L = 3 sem considerar a dinâmica entre os spins da rede. O modelo Hamiltoniano utilizado consiste em um ambiente bosônico livre e um acoplamento spin-bóson, com dois canais de descoerência, X e Z. Uma interação efetiva de longo alcance, anisotrópica, entre todos os pares de spins da rede é então proposta como um modelo correlacionado. A correlação está diretamente associada à amplitude e ao alcance da interação entre os spins. Mostramos que a escala de tempo do decaimento da fidelidade depende destes fatores.

Ambientes correlacionados

Código tórico

Método KPM

Correlated environments

Toric code

KPM method

CNPQ::CIENCIAS EXATAS E DA TERRA::FISICA

Superfícies multitóricas, obstrução de Euler e aplicações / Multitoric surfaces, Euler obstruction and applications

Thaís Maria Dalbelo

24 October 2014

Neste trabalho estudamos superfícies com a propriedade que suas componentes irredutíveis são superfícies tóricas. Em particular, apresentamos uma fórmula para calcular a obstrução de Euler local destas superfícies. Como uma aplicação desta fórmula, calculamos a obstrução de Euler local para algumas famílias de superfícies determinantais. Além disso, definimos a característica de Euler evanescente de uma superfície tórica normal Xσ, damos uma fórmula para calcular tal invariante e relacionamos este número com a segunda multiplicidade polar de Xσ. Apresentamos também, uma fórmula para a obstrução de Euler de uma função f : Xσ → C e para o número de Brasselet de tal função. Como uma aplicação deste resultado, calculamos a obstrução de Euler de um tipo de polinômio definido em uma família de superfícies determinantais. / In this work we study surfaces with the property that their irreducible components are toric surfaces. In particular, we present a formula to compute the local Euler obstruction of such surfaces. As an application of this formula we compute the local Euler obstruction for some families of determinantal surfaces. Furthermore, we define the vanishing Euler characteristic of a normal toric surface Xσ, we give a formula to compute it, and we relate this number with the second polar multiplicity of Xσ. We also present a formula for the Euler obstruction of a function f : Xσ → C and for the Brasselet number of it. As an application of this result we compute the Euler obstruction of a type of polynomial on a family of determinantal surfaces.

Superfícies multitóricas

Superfícies tóricas

Multitoric surfaces

Toric surfaces

Sur la géométrie des solitons de Kähler-Ricci dans les variétés toriques et horosphériques / On the geometry of Kähler-Ricci solitons on toric and horospherical manifold

Delgove, François

04 April 2019

Cette thèse traite des solitons de Kähler-Ricci qui sont des généralisations naturelles des métriques de Kähler-Einstein. Elle est divisée en deux parties. La première étudie la décomposition solitonique de l’espace des champs de vecteurs holomorphes dans le cas des variétés toriques. La seconde partie étudie de manière analytique les variétés horosphériques en redémontrant par la méthode de la continuité l’existence de solitons de Kähler-Ricci sur ces variétés et en calculant après la borne supérieure de Ricci. / This thesis deal with Kähler-Ricci solitons which are natural generalizations of Kähler-Einstein metrics. It is divided into two parts. The first one studies the solitonic decomposition of the space of holomorphic vector spaces in the case of toric manifold. The second one studies is an analytic way the existence of horospherical Kähler-Ricci solitons on those manifolds and then computes the greatest Ricci lower bound.

Solitons de Kähler-Ricci

Variétés toriques

Géométrie Kählérienne

Métriques de Kähler-Einstein

Kähler-Ricci solitons

Toric manifold

Kähler geometry

Kähler-Einstein metrics

<i>A</i>-Hypergeometric Systems and <i>D</i>-Module Functors

Avram W Steiner (6598226)

15 May 2019

<div>Let A be a d by n integer matrix. Gel'fand et al.\ proved that most A-hypergeometric systems have an interpretation as a Fourier–Laplace transform of a direct image. The set of parameters for which this happens was later identified by Schulze and Walther as the set of not strongly resonant parameters of A. A similar statement relating A-hypergeometric systems to exceptional direct images was proved by Reichelt. In the first part of this thesis, we consider a hybrid approach involving neighborhoods U of the torus of A and consider compositions of direct and exceptional direct images. Our main results characterize for which parameters the associated A-hypergeometric system is the inverse Fourier–Laplace transform of such a "mixed Gauss–Manin system". </div><div><br></div><div>If the semigroup ring of A is normal, we show that every A-hypergeometric system is "mixed Gauss–Manin". </div><div><br></div><div>In the second part of this thesis, we use our notion of mixed Gauss–Manin systems to show that the projection and restriction of a normal A-hypergeometric system to the coordinate subspace corresponding to a face are isomorphic up to cohomological shift; moreover, they are essentially hypergeometric. We also show that, if A is in addition homogeneous, the holonomic dual of an A-hypergeometric system is itself A-hypergeometric. This extends a result of Uli Walther, proving a conjecture of Nobuki Takayama in the normal homogeneous case.</div>

Algebraic geometry

Commutative algebra

D-modules

Local cohomology

Affine semigroup rings

Toric varieties

GKZ systems

A Quantum Lefschetz Theorem without Convexity

Wang, Jun

01 October 2020

No description available.

Mathematics

Gromov-Witten theory

quantum Lefschetz theorem

convexity

toric stack

quasimap theory

Wall-crossing

root stack

moduli space

mirror theorem

QUANTUM COHOMOLOGY OF TORIC BUNDLES / トーリック束の量子コホモロジー

Koto, Yuki

25 March 2024

京都大学 / 新制・課程博士 / 博士(理学) / 甲第25088号 / 理博第4995号 / 新制||理||1713(附属図書館) / 京都大学大学院理学研究科数学・数理解析専攻 / (主査)教授 入谷 寛, 教授 塚本 真輝, 教授 吉川 謙一 / 学位規則第4条第1項該当 / Doctor of Agricultural Science / Kyoto University / DGAM

Gromov-Witten theory

quantum cohomology

toric bundle

Givental cone

analytic quantum D-module

mirror theorem

virtual localization formula

400

Surfaces multi-toriques, obstruction d' Euler et applications / Multitoric surfaces, Euler obstruction and applications

Dalbelo, Thais maria

24 October 2014

Dans ce travail, nous étudions les surfaces dont les composantes irréductibles sont des surfaces toriques. En particulier, nous donnons une formule pour calculer l'obstruction d'Euler locale de ces surfaces. Comme application de cette formule, nous calculons l'obstruction d'Euler locale pour certaines familles de surfaces déterminantales. De plus, nous définissons et donnons une formule pour calculer la caractéristique d'Euler évanescente d'une surface torique normale $X_{sigma}$. Nous montrons que ce nombre est relié à la seconde multiplicité polaire de $X_{sigma}$. Nous présentons aussi une formule pour l'obstruction d'Euler d'une fonction $f: X_{sigma} to mathbb{C}$ et pour le nombre de Brasselet d'une telle fonction. Comme application de ce résultat nous calculons l'obstruction d'Euler d'un type de polynôme sur une famille de surfaces déterminantales. / In this work we study surfaces with the property that their irreducible components are toric surfaces. In particular, we present a formula to compute the local Euler obstruction of such surfaces. As an application of this formula we compute the local Euler obstruction for some families of determinantal surfaces. Furthermore, we define the vanishing Euler characteristic of a normal toric surface $X_{sigma}$, we give a formula to compute it, and we relate this number with the second polar multiplicity of $X_{sigma}$. We also present a formula for the Euler obstruction of a function $f: X_{sigma} to mathbb{C}$ and for the Brasselet number of it. As an application of this result we compute the Euler obstruction of a type of polynomial on a family of determinantal surfaces.

Surfaces toriques

Surfaces multi-Toriques

L'obstruction d'Euler

Caractéristique d'Euler évanescente

Multiplicité polaire

Toric surfaces

Multitorics surfaces

Euler obstruction

Vanishing Euler characteristic

Polar multiplicity

510

Actions des groupes algébriques sur les variétés affines et normalité d'adhérences d'orbites / Actions of algebraic groups on affine varieties and normality of orbits closures

Kuyumzhiyan, Karine

10 May 2011

Cette thèse est consacrée aux actions des groupes de transformations algébriques sur les variétés affines algébriques. Dans la première partie, on étudie la normalité des adhérences des orbites de tore maximal dans un module rationnel de groupe algébrique simple. La seconde partie porte sur les actions du groupe d'automorphismes d'une variété affine. Nous nous intéressons aux propriétés de transitivité et de transitivité multiple de ces actions sur le lieu lisse de la variété. / This thesis is devoted to the actions of groups of algebraic transformations on affine algebraic varieties. In the first part we study normality of closures of maximal torus orbits in the rational modules of simple algebraic groups. The second part deals with actions of automorphism groups on affine varieties. We study here transitivity and multiple transitivity of such an action on the set of smooth points.

Actions des groupes algébriques

Normalité

Variété torique

Propriété de saturation

Transitivité infinie

Automorphisme spécial

Algebraic group actions

Normality

Toric variety

Saturation property

Infinite transitivity

Special automorphism

510

Compactification d'espaces homogènes sphériques sur un corps quelconque / Compactification of spherical homogeneous spaces over an arbitrary field

Huruguen, Mathieu

29 November 2011

Cette thèse porte sur les plongements d'espaces homogènes sphériques sur un corps quelconque. Dans une première partie, on aborde la classification de ces plongements, dans la lignée des travaux de Demazure et bien d'autres sur les variétés toriques, et de Luna, Vust et Knop sur les variétés sphériques. Dans une seconde partie, on généralise en caractéristique positive certains résultats obtenus par Bien et Brion portant sur les plongements complets et lisses qui sont log homogènes, c'est-à-dire dont le bord est un diviseur à croisements normaux et le fibré tangent logarithmique associé est engendré par ses sections globales. Dans une dernière partie, on construit par éclatements successifs une compactification lisse et log homogène explicite du groupe linéaire (différente de celle obtenue par Kausz). En prenant dans cette compactification les points fixes de certains automorphismes, on en déduit alors la construction de compactifications lisses et log homogènes de certains groupes semi-simples classiques. / This thesis is devoted to the study of embeddings of spherical homogeneous spaces over an arbitrary field. In the first part, we address the classification of such embeddings, in the spirit of Demazure and many others in the setting of toric varieties and of Luna, Vust and Knop in the setting of spherical varieties. In the second part, we generalize in positive characteristics some results obtained by Bien and Brion on those complete smooth embeddings that are log homogeneous, i.e., whose boundary is a normal crossing divisor and the associated logarithmic tangent bundle is generated by its global sections. In the last part, we construct an explicit smooth log homogeneous compactification of the general linear group by successive blow-ups (different from the one obtained by Kausz). By taking fixed points of certain automorphisms on this compactification, one gets smooth log homogeneous compactifications of some classical semi-simple groups.

Variété torique

Variété sphérique

Variété log homogène

Groupe semi-simple

Toric variety

Spherical variety

Log homogeneous variety

Semi-simple group

510