Frames Generated by Actions of Locally Compact Groups

Iverson, Joseph

27 October 2016

Let $G$ be a second countable, locally compact group which is either compact or abelian, and let $\rho$ be a unitary representation of $G$ on a separable Hilbert space $\mathcal{H}_\rho$. We examine frames of the form $\{ \rho(x) f_j \colon x \in G, j \in I\}$ for families $\{f_j\}_{j \in I}$ in $\mathcal{H}_\rho$. In particular, we give necessary and sufficient conditions for the joint orbit of a family of vectors in $\mathcal{H}_\rho$ to form a continuous frame. We pay special attention to this problem in the setting of shift invariance. In other words, we fix a larger second countable locally compact group $\Gamma \supset G$ containing $G$ as a closed subgroup, and we let $\rho$ be the action of $G$ on $L^2(\Gamma)$ by left translation. In both the compact and the abelian settings, we introduce notions of Zak transforms on $L^2(\Gamma)$ which simplify the analysis of group frames. Meanwhile, we run a parallel program that uses the Zak transform to classify closed subspaces of $L^2(\Gamma)$ which are invariant under left translation by $G$. The two projects give compatible outcomes. This dissertation contains previously published material.

compact group

dual integrable

group frame

LCA group

shift-invariant

Zak transform

Modelos integráveis multicarregados e integrabilidade no plano não comutativo

Cabrera Carnero, Iraida [UNESP]

02 1900

Made available in DSpace on 2014-06-11T19:32:10Z (GMT). No. of bitstreams: 0 Previous issue date: 2003-02Bitstream added on 2014-06-13T20:23:07Z : No. of bitstreams: 1 cabreracarnero_i_dr_ift.pdf: 1015322 bytes, checksum: 915c6683e6c1c022f54ca1d9f5a03904 (MD5) / Nesta fase construísmo e estudamos uma nova classe de modelos integráveis (relativístico e não relativístico) em duas dimensões, associados à álgebra afim 'A IND.3 POT.(1)'. Estes modelos apresentam sólitons tipológicos os quais portam duas cargas elétricas U(1) X U(1). O modelo de Toda afim (relativístico) é construído a partir do modelo WZNW mediante a calibração da ação Swznw e corresponde ao primeiro membro de grau negativo q = -1 de uma hierarquia de modelos cKP do tipo dyon. O modelo mais simples não relativístico dentro desta hierarquia corresponde ao grau q = 2 positivo. As soluções de 1-sóliton para ambos modelos foram construídas e relações explícitas entre ambas soluções (assim como entre as cargas conservadas) foram encontradas. Outro modelo integrável com simetrias não abelianas locais SL(2) X U(1) é introduzido. Numa aproximação à integrabilidade em espaços não-comutativos estudamos generalizações não comutativas no plano dos modelos integráveis bidimensionais sine-, sinh-Gordon e U(N) Quiral Principal. Calculando a amplitude de espalhamento à nível de árvore de um processo de produção de partículas provamos que a versão não-comutativa do modelo de sinh-Gordon que se obtém mediante a deformação Moyal da respectiva ação não é integrável. Por outro lado, a incorporação de vínculos adicionais que são obtidos a partir da generalização da condição de curvatura nula, tornam o modelo integrável. O modelo Quiral Principal generalizado a partir da deformação Moyal da ação, preserva a sua integrabilidade, ao contrário dos modelos sinh-Gordon e sine-Gordon. / In this thesis we have constructed and studied a new class of two-dimensional integrable models (relativistic and nonrelativistic), related to the affine algebra 'A IND.3 POT.(1)'. These models admit U(1) X U(1) charged topological solitons. The affine Toda relativistic model is constructed from the gauged WZNW action and corresponds to the first negative grade q = -1 member of a dyonic hierarchy of cKP models. The simplest nonrelativistic model corresponds to the positive grade q = 2 of this hierarchy. The 1-soliton solutions for both models were constructed and explicit relations between them (and the conserved charges as well) were found. Another integrable model with local nonabelian SL(2) X U(1) simetries is introduced. In the context of integrability on noncommutative spaces, we have studied noncommutative generalizations on the plane of the two-dimensional integrable models sine-, sinh-Gordon and U(N) Principal Quiral. By computing for the sinh-Gordon model, the tree-level amplitude of a process of production of particles, we proved that the noncommutative generalization of this model that it is obtained by the Moyal deformation of the corresponding action is not integrable. On the other hand, the addition of extra constraints, obtained by the generalization of the zero-curvature method, renders the integrability of the model. The generalization of the Principal Quiral model by the Moyal deformation of the action preserves the integrability, contrary to the previous case

Solitons

Integrable models

Field theory

Non-linear systems

Exact solutions

Noncommutative geometry

Fórmula de aproximação de Baouendi-Treves e aplicações / Baouendi-Treves approximation formula and applications

Luís Márcio Salge

26 June 2015

O objetivo principal de estudo deste trabalho são as estruturas localmente integráveis L e a fórmula de aproximação de Baouendi-Treves, segundo a qual qualquer solução homogênea de Lu = 0, pode, localmente, ser aproximada por polinômios nas suas integrais primeiras. A realização deste projeto requer um estudo rigoroso de alguns aspectos da teoria das estruturas involutivas e da teoria das distribuições. As principais referências são [2], [4] e [1]. / The main goal of this project is to study a locally integrable structures L and the Baouendi-Treves approximation formula, which states that every homogeneous solution of Lu = 0, can be, locally, approximated by polynomials in their first integrals. This result requires the rigorous study of some aspects of the involutive structures theory and of the distributions theory. The main references are [2], [4] e [1].

Distribuições

Estruturas localmente integráveis

Fórmula de Baouendi-Treves

Baouendi-Treves formula

Distribuitions

Locally integrable structures

Vides et modularité dans les théories de jauge supersymétriques N = 1* / Modularity and vacua in N = 1* supersymmetric gauge theory

Bourget, Antoine

01 July 2016

Nous explorons la structure des vides dans une déformation massive de la théorie de Yang-Mills maximalement supersymétrique en quatre dimensions. Sur un espace-temps topologiquement trivial, la théorie des orbites nilpotentes dans les algèbres de Lie rend possible le calcul exact de l'indice de Witten. Nous en donnons les fonctions génératrices pour les algèbres classiques, et recourons à un calcul explicite pour les exceptionnelles. Après compactification sur un cercle, un lien entre les théories de jauge supersymétriques et les systèmes intégrables est exploitable pour réduire la chasse aux vides à une extrémisation du hamiltonien de Calogero-Moser elliptique twisté. Une analyse soigneuse des propriétés globales du groupe de jauge et des opérateurs de ligne est nécessaire pour obtenir un accord parfait. En combinant exploration numérique sur ordinateur et contrôle analytique grâce à la théorie des formes modulaires, nous exhibons la structure des vides massifs pour des algèbres de rang petit, et mettons en évidence de nouvelles propriétés modulaires. Nous montrons que des branches de vides de masse nulle existent, et nous en donnons la structure exacte pour les algèbres de rang deux. / We investigate the vacuum structure of a massive deformation of the maximally supersymmetric Yang-Mills gauge theory in four dimensions. When the topology of spacetime is trivial, the Witten index can be computed exactly for any gauge group using the theory of nilpotent orbits in Lie algebras. We provide generating functions for classical algebras and an explicit calculation for the exceptional ones. Upon compactification on a circle, one can use a bridge between supersymmetric gauge theories and complex integrable systems to reduce the analysis of vacua to the search of extrema of the twisted elliptic Calogero-Moser Hamiltonian. A careful inspection of global properties of the gauge group and line operators are needed to reach total agreement. Using a combination of numerical exploration on a computer and analytical control through the theory of modular forms, we determine the structure of massive vacua for low-rank gauge algebras and exhibit new modular properties. We also show that massless branches of vacua can exist, and provide an analytic description for rank two gauge algebras.

Théories de jauges supersymétriques

Systèmes intégrables

Modularité

Supersymmetric gauge theories

Integrable systems

Modularity

530

Nonlinear Wave Motion in Viscoelasticity and Free Surface Flows

Ussembayev, Nail

24 July 2020

This dissertation revolves around various mathematical aspects of nonlinear wave motion in viscoelasticity and free surface flows. The introduction is devoted to the physical derivation of the stress-strain constitutive relations from the first principles of Newtonian mechanics and is accessible to a broad audience. This derivation is not necessary for the analysis carried out in the rest of the thesis, however, is very useful to connect the different-looking partial differential equations (PDEs) investigated in each subsequent chapter. In the second chapter we investigate a multi-dimensional scalar wave equation with memory for the motion of a viscoelastic material described by the most general linear constitutive law between the stress, strain and their rates of change. The model equation is rewritten as a system of first-order linear PDEs with relaxation and the well-posedness of the Cauchy problem is established. In the third chapter we consider the Euler equations describing the evolution of a perfect, incompressible, irrotational fluid with a free surface. We focus on the Hamiltonian description of surface waves and obtain a recursion relation which allows to expand the Hamiltonian in powers of wave steepness valid to arbitrary order and in any dimension. In the case of pure gravity waves in a two-dimensional flow there exists a symplectic coordinate transformation that eliminates all cubic terms and puts the Hamiltonian in a Birkhoff normal form up to order four due to the unexpected cancellation of the coefficients of all fourth order non-generic resonant terms. We explain how to obtain higher-order vanishing coefficients. Finally, using the properties of the expansion kernels we derive a set of nonlinear evolution equations for unidirectional gravity waves propagating on the surface of an ideal fluid of infinite depth and show that they admit an exact traveling wave solution expressed in terms of Lambert’s W-function. The only other known deep fluid surface waves are the Gerstner and Stokes waves, with the former being exact but rotational whereas the latter being approximate and irrotational. Our results yield a wave that is both exact and irrotational, however, unlike Gerstner and Stokes waves, it is complex-valued.

weakly nonlinear surface waves

Birkhoff normal form

Integrable systems

Hamiltonian PDEs

Water waves problem

Zener model

Integrable deformations of string sigma models and generalized supergravity / 弦理論を記述するシグマ模型の可積分変形と一般化された超重力理論

Sakamoto, Junichi

25 March 2019

京都大学 / 0048 / 新制・課程博士 / 博士(理学) / 甲第21561号 / 理博第4468号 / 新制||理||1641(附属図書館) / 京都大学大学院理学研究科物理学・宇宙物理学専攻 / (主査)准教授 福間 將文, 教授 田中 貴浩, 准教授 國友 浩 / 学位規則第4条第1項該当 / Doctor of Science / Kyoto University / DGAM

AdS/CFT correspondence

Integrable deformations

sigma model

string duality

supergravity

AdS_5×S^5 superstring

400

Integrable deformations in 2D dilaton gravity models / 可積分変形に基づいた2次元ディラトン重力模型の研究

Okumura, Suguru

23 March 2021

京都大学 / 新制・課程博士 / 博士(理学) / 甲第22994号 / 理博第4671号 / 新制||理||1670(附属図書館) / 京都大学大学院理学研究科物理学・宇宙物理学専攻 / (主査)教授 畑 浩之, 教授 川合 光, 教授 田中 貴浩 / 学位規則第4条第1項該当 / Doctor of Science / Kyoto University / DFAM

Integrable deformation

2D dilaton gravity

TTbar-deformations

Yng-Baxter deformations

400

Uma introdução à integral de Riemann contextualizada ao ensino médio /

Silva, Daniel Ferreira da

January 2019

Orientador: Fabiano Borges da Silva / Resumo: Neste trabalho apresentamos a definição da integral de Riemann por meio de so­matórios de retângulos que aproximam pela falta e pelo excesso a região sob uma curva definida por uma função. Posteriormente mostramos que as funções contínuas definidas num intervalo fechado e limitado [a, b] são integráveis e fornecemos um exemplo de função não integrável. Finalmente apresentamos o Teorema Fundamental do Cálculo e uma abor­dagem para a teoria de integração que pode ser aplicada no contexto do Ensino Médio. / Abstract: ln this work we present the definition of the Riemann integral by summing rectangles that approximate the region under a curve defined by a function due to lack and excess. Then we show that continuous functions defined in a closed and limited interval [a, b] are integrable, and after we provide an example of an unintegrable function. Finally we present the Fundamental Calculus Theorem and an approach to integration theory that can be applied in the High School context. / Mestre

Funções integráveis

Riemann

Funções contínuas.

Teorema fundamental do cálculo

Integrable functions

Funções contínuas.

Fundamental calculus theorem

Anyons in (1 + 1) dimensions and the deformed Calogero-Sutherland model

Atai, Farrokh

January 2011

This thesis deals with a conformal field theoretical treatment of abelian anyons in (1 + 1)-dimensions and their relation to the integrable Calogero-Sutherland models. We generalize previous work relating anyons to the Calogero-Sutherland model by showing that the correlation function of the anyon field operators corresponds to the eigenfunctions of the deformed Calogero-Sutherland model. Our results suggest a physical application of the deformed Calogero-Sutherland model in the context of the fractional quantum Hall effect (FQHE). A key aspect for this work is the introduction of the dual anyon field operators, which obey a natural generalization of the canonical anti-commutation relation.

Key words: FQHE

Anyons

Integrable many-body system

Deformed Calogero-Sutherland model

Physical Sciences

Fysik

The R-matrix bootstrap

Harish Murali (10723740)

30 April 2021

In this thesis, we extend the numerical S-matrix bootstrap program to 1+1d theories with a boundary, where we bootstrap the 1-to-1 reflection matrix (R-matrix). We review the constraints that a physical R-matrix must obey, namely unitarity, analyticiy and crossing symmetry. We then carve out the allowed space of 2d R-matrices with the O(N) nonlinear sigma model and the periodic Yang Baxter solution in the bulk. We find a variety of integrable R-matrices along the boundary of the allowed space both with and without free parameters. The integrable models without a free parameter appear at vertices of the allowed space, while those with a free parameter occupy the whole boundary. We also introduce the extended analyticity constraint where we increase the domain of analyticity beyond the physical region. In some cases, the allowed space of R-matrices shrinks drastically and we observe new vertices which correspond to integrable theories. We also find a new integrable R-matrix through our numerics, which we later obtained by solving the boundary Yang--Baxter equation. Finally, we derive the dual to the extended analyticity problem and find that the formalism allows for R-matrices which do not saturate unitarity to lie on the boundary of the allowed region.

Particle Physics

Nonperturbative Effects

Boundary Quantum Field Theories

Integrable Field Theories

Field Theories in Lower Dimensions