Polinômios e funções inteiras com zeros reais / Polynomials and entire functions with real zeros

Lucas, Fábio Rodrigues

16 August 2018

Orientador: Dimitar Kolev Dimitrov / Tese (doutorado) - Universidade Estadual de Campinas, Instituto de Matematica, Estatistica e Computação Cientifica / Made available in DSpace on 2018-08-16T01:35:19Z (GMT). No. of bitstreams: 1 Lucas_FabioRodrigues_D.pdf: 837192 bytes, checksum: 1cec40a06f620203e95cbca6134fd41a (MD5) Previous issue date: 2010 / Resumo: Nesta tese abordamos alguns problemas relacionados com zeros de polinômios e de funções inteiras. Estabelecemos fórmulas explícitas para os polinômios da sequência de Sturm, gerada por um polinômio e pela sua derivada. Como consequência, obtemos condições necessárias e suficientes para que um polinômio sem zeros múltiplos tenha somente zeros reais. Provamos também a veracidade de algumas condições necessárias para a hipótese de Riemann, estendendo desta forma um resultado anterior de Csordas, Norfolk e Varga que estabelecem uma conjectura de Pólya / Abstract: In this thesis we approach problems concerning zeros of polynomials and entire functions. We establish explicit formula for the polynomial in the Sturm sequence, generated by a polynomial and its derivative. As a consequence, we obtain necessary and sufficient conditions for a polynomial without multiple zeros to possess only real zeros. We prove also the truth of certain necessary conditions for the Riemann Hypothesis, thus extending a previous result of Csordas, Norfolk and Varga who established a conjecture of Pôlya / Doutorado / Analise Aplicada / Doutor em Matemática Aplicada

Polinômios

Funções inteiras

Riemann, Hipótese de

Polynomials

Entire functios

Riemann's hypothesis

Funções ordens fracas e a distancia minima dos codigos geometricos de Goppa

Silva, Ercílio Carvalho da

30 July 2004

Orientador: Fernando Eduardo Torres Orihuela / Tese (doutorado) - Universidade Estadual de Campinas. Instituto de Matemática, Estatística e Computação Científica / Made available in DSpace on 2018-08-03T23:57:41Z (GMT). No. of bitstreams: 1 Silva_ErcilioCarvalho_D.pdf: 325874 bytes, checksum: d9e2b3d0bfa8443874c08e8ad78d0b45 (MD5) Previous issue date: 2004 / Resumo: Como uma generalizacao do conceito de Função Ordem, introduzido por T. Høholdt, J. H. van Lint e R. Pellikaan, nesta tese apresentamos a nocao de Funcao Ordem Fraca com o objetivo de obter construcoes alternativas dos codigos geometricos de Goppa. Os codigos obtidos por Høholdt, van Lint e Pellikaan estao tipicamente associados aos codigos pontuais de Goppa; ja os nossos, correspondem aos codigos bi-pontuais. Em varios destes casos, a cota inferior para a distancia m'inima do codigo e melhor que qualquer cota correspondente conhecida na literatura / Abstract: Hoholdt, van Lint and Pellikaan introduced the order functions and apply them to the construction of good codes. For the case of curves, their theory fits very well for the so-called one-point Goppa codes. In this work we define the notion of ¿weak order function¿and show that we can construct good two-point Goppa codes / Doutorado / Matematica / Doutor em Matemática

Teoria da codificação

Geometria algébrica

Riemann-Roch, Teoremas de

Curvas algébricas

Omissões da aplicação normal de Gauss e o teorema de Mo-Osserman

Ferreira de Oliveira, Darlan

January 2006

Made available in DSpace on 2014-06-12T18:33:03Z (GMT). No. of bitstreams: 2 arquivo8678_1.pdf: 651005 bytes, checksum: ec2e9b73a9128d7f8de4f13552fd4339 (MD5) license.txt: 1748 bytes, checksum: 8a4605be74aa9ea9d79846c1fba20a33 (MD5) Previous issue date: 2006 / Neste trabalho mostramos alguns dos principais resultados acerca do número de pontos omitidos pela aplicação normal de Gauss de superfícies mínimas regulares completas. Começamos com uma das versões do teorema de Bernstein e citamos os resultados conseguidos, no sentido de seu melhoramento, por Osserman, Xavier e Fujimoto. Por fim introduzimos o teorema de Mo-Osserman o qual se caracteriza como uma extensão do teorema de Fujimoto

Aplicação de Gauss

Representação de Weierstrass

Superfícies mínimas

Superfície Riemann

Modelling of flood waves based on wave propagation : algorithms with bed efflux and influx including a coupled-pipe network solver

Mahdizadeh, Hossein

January 2011

Flood propagation over urban areas can cause an interaction between the free-surface flow and large underground pipe networks used for storm drainage and sewage, causing outflows and inflows at the bed. The associated waves may collide with each other and the surface waves. In this thesis the shallow water equations are used to model this type of wave interaction over dry or wet beds with bathymetry gradients and friction terms. The proposed shallow water scheme is solved based on finite volume high-resolution Godunov-type methods. The solver is well-balanced and can accurately balance the source terms and flux-gradients for the steady-state solutions. The solver also utilises a new type of Riemann wave speed to provide depth-positive results over nearly dry beds and dry states. Additionally a new type of source term is introduced in the continuity equation to model pipe inflow and outflow conditions at bed connections. For the standard one-dimensional shallow water equations the numerical results are validated with analytical solutions or other reference solutions provided in the literature. This includes the incipient Riemann problems for nearly dry and dry-states, steady flow over a hump in a rectangular channel and the wave propagation problem. Eventually, the generation of dry bed in the middle, over discontinuous topography is considered. Close agreement is achieved between the shallow water scheme and analytical or reference solutions for the above test cases. For the shallow water problems with influx/efflux source terms comparisons are made with STAR-CD, a commercial Navier-Stokes solver for general fluid flow prediction. The shallow water model is first used to simulate vertical flows through finite gaps in the bed. Next, the interaction of the vertical flows with a dam-break flow is considered for both dry and wet beds. An efflux number, En, is defined based on the vertical efflux velocity and the gap length. A parameter study is undertaken to investigate the effect of the one-dimensional approximation of the present model, for a range of non-dimensional efflux numbers. It is found that the shallow flow model gives sensible predictions at all times provided En<0.5, and for long durations for En>0.5. Dam break flow over an underground connecting pipe is also considered for the one-dimensional efflux problems. To solve two-dimensional problems the shallow water scheme uses the dimensional-splitting method which solves each one-dimensional Riemann problem in the x- and y-directions separately. The cross-derivative terms for second-order accuracy are incorporated by solving another Riemann problem in the orthogonal direction. For two-dimensional problems first the dam-break problems are considered over wet and dry beds. Then, flood propagation over complex terrain is demonstrated. Next, efflux discharge is modelled in isolation over a dry bed and then with dam-break interaction, comparing with STAR-CD results. Again very good agreement is shown between the two-dimensional shallow water model and STAR-CD for the efflux numbers of En<0.5. For modelling the inundation problem over an underground pipe network the solver is coupled with the general underground pipe network solver to calculate the efflux discharge as the flood waves pass through the pipe network. For analysing the pipe network with unknown effluxes an additional set of equations is incorporated into the solution of a general pipe network solver. The shallow water solver coupled to an underground pipe network is then used to simulate dam-break interaction with pipe networks with 9 and 25 nodes to demonstrate the versatility of the method.

627

Schémas de type Godunov pour la modélisation hydrodynamique et magnétohydrodynamique / Godunov-type schemes for hydrodynamic and magnetohydrodynamic modeling

Vides Higueros, Jeaniffer

21 October 2014

L’objectif principal de cette thèse concerne l’étude, la conception et la mise en œuvre numérique de schémas volumes finis associés aux solveurs de type Godunov. On s’intéresse à des systèmes hyperboliques de lois de conservation non linéaires, avec une attention particulière sur les équations d’Euler et les équations MHD idéale. Tout d’abord, nous dérivons un solveur de Riemann simple et véritablement multidimensionnelle, pouvant s’appliquer à tout système de lois de conservation. Ce solveur peut être considéré comme une généralisation 2D de l’approche HLL. Les ingrédients de base de la dérivation sont : la consistance avec la formulation intégrale et une utilisation adéquate des relations de Rankine-Hugoniot. Au final nous obtenons des expressions assez simples et applicables dans les contextes des maillages structurés et non structurés. Dans un second temps, nous nous intéressons à la préservation, au niveau discret, de la contrainte de divergence nulle du champ magnétique pour les équations de la MHD idéale. Deux stratégies sont évaluées et nous montrons comment le solveur de Riemann multidimensionnelle peut être utilisé pour obtenir des simulations robustes à divergence numérique nulle. Deux autres points sont abordés dans cette thèse : la méthode de relaxation pour un système Euler-Poisson pour des écoulements gravitationnels en astrophysique, la formulation volumes finis en coordonnées curvilignes. Tout au long de la thèse, les choix numériques sont validés à travers de nombreux résultats numériques. / The main objective of this thesis concerns the study, design and numerical implementation of finite volume schemes based on the so-Called Godunov-Type solvers for hyperbolic systems of nonlinear conservation laws, with special attention given to the Euler equations and ideal MHD equations. First, we derive a simple and genuinely two-Dimensional Riemann solver for general conservation laws that can be regarded as an actual 2D generalization of the HLL approach, relying heavily on the consistency with the integral formulation and on the proper use of Rankine-Hugoniot relations to yield expressions that are simple enough to be applied in the structured and unstructured contexts. Then, a comparison between two methods aiming to numerically maintain the divergence constraint of the magnetic field for the ideal MHD equations is performed and we show how the 2D Riemann solver can be employed to obtain robust divergence-Free simulations. Next, we derive a relaxation scheme that incorporates gravity source terms derived from a potential into the hydrodynamic equations, an important problem in astrophysics, and finally, we review the design of finite volume approximations in curvilinear coordinates, providing a fresher view on an alternative discretization approach. Throughout this thesis, numerous numerical results are shown.

Schéma de type Godunov

Solveur de Riemann multidimensionnel

Solveur de Riemann approché

Méthode de relaxation

Lois de conservation

Dynamique des gaz

Magnétohydrodynamique

Effets gravitationnels

Godunov-type scheme

Multidimensional Riemann solver

Approximate Riemann solver

Relaxation method

Conservation laws

Gas dynamics

Magnetohydrodynamics

Gravitational effects

Tropical Theta Functions and Riemann-Roch Inequality for Tropical Abelian Surfaces / トロピカルテータ関数とトロピカルAbel曲面に対するRiemann-Roch不等式

Sumi, Ken

23 March 2021

京都大学 / 新制・課程博士 / 博士(理学) / 甲第22971号 / 理博第4648号 / 新制||理||1668(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 吉川 謙一, 教授 加藤 毅 / 学位規則第4条第1項該当 / Doctor of Science / Kyoto University / DFAM

tropical geometry

Riemann-Roch

theta function

tropical abelian variety

400

Propedeutika diferenciálního a integrálního počtu / Propedeutics of differential and integral calculi

Malachov, Martin

January 2020

Propaedeutics of Differential and Integral Calculi Author: Ing. Martin Malachov Department: Department of Mathematics Education Supervisor: Zdeněk Halas, DiS., Ph.D. Department of Mathematics Education Keywords: propaedeutics, derivative, Riemann integral, applications Differential and integral calculi both are interesting and beautiful branches of mathematics with many interdisciplinary overlaps and significant and practi- cal applications. Learning as well as teaching of these topics is very difficult and demanding. In this thesis we show that the derivatives and integrals have much to offer in the high school education while the schooling can be eased and made attractive with intentional propaedeutics and knowledge of rich background of applications. First part of the thesis presents short contem- plation on the current state of teaching and literature, we focus on the urge for the propaedeutics of the differential and integral calculi revealed by us. We identify key terms that can be used to build useful preconcepts during the whole high school education, even in the elementary education. In the latter part of the thesis we offer teacher innovative texts and a rich set of origi- nal exercises that can be used for motivation, application and propaedeutics of the differential and integral calculi. We also present...

A homotopical description of Deligne–Mumford compactifications

Deshmukh, Yash Uday

January 2023

In this thesis I will give a description of the Deligne–Mumford properad expressing it as the result of homotopically trivializing S¹ families of annuli (with appropriate compatibility conditions) in the properad of smooth Riemann surfaces with parameterized boundaries. This gives an analog of the results of Drummond-Cole and Oancea–Vaintrob in the setting of properads. We also discuss a variation of this trivialization which gives rise to a new partial compactification of Riemann surfaces relevant to the study of operations on symplectic cohomology.

Mathematics

Riemann surfaces

Homotopy theory

Operads

Cohomology operations

Thermoacoustic Riemann Solver Finite Volume Method With Application To Turbulent Premixed Gas Turbine Combustion Instability

Johnson, Perry

01 January 2013

This thesis describes the development, verification, and validation of a three dimensional time domain thermoacoustic solver. The purpose of the solver is to predict the frequencies, modeshapes, linear growth rates, and limit cycle amplitudes for combustion instability modes in gas turbine combustion chambers. The linearized Euler equations with nonlinear heat release source terms are solved using the finite volume method. The treatment of mean density gradients was found to be vital to the success of frequency and modeshape predictions due to the sharp density gradients that occur across deflagration waves. In order to treat mean density gradients with physical fidelity, a non-conservative finite volume method based on the wave propagation approach to the Riemann problem is applied. For modelling unsteady heat release, user input flexibility is maximized using a virtual class hierarchy within the OpenFOAM C++ library. Unsteady heat release based on time lag models are demonstrated. The solver gives accurate solutions compared with analytical methods for one-dimensional cases involving mean density gradients, cross-sectional area changes, uniform mean flow, arbitrary impedance boundary conditions, and unsteady heat release in a one-dimensional Rijke tube. The solver predicted resonant frequencies within 1% of the analytical solution for these verification cases, with the dominant component of the error coming from the finite time interval over which the simulation is performed. The linear iii growth rates predicted by the solver for the Rijke tube verification were within 5% of the theoretical values, provided that numerical dissipation effects were controlled. Finally, the solver is then used to predict the frequencies and limit cycle amplitudes for two lab scale experiments in which detailed acoustics data are available for comparison. For experiments at the University of Melbourne, an empirical flame describing function was provided. The present simulation code predicted a limit cycle of 0.21 times the mean pressure, which was in close agreement with the estimate of 0.25 from the experimental data. The experiments at Purdue University do not yet have an empirical flame model, so a general vortex-shedding model is proposed on physical grounds. It is shown that the coefficients of the model can be tuned to match the limit cycle amplitude of the 2L mode from the experiment with the same accuracy as the Melbourne case. The code did not predict the excitation of the 4L mode, therefore it is concluded that the vortex-shedding model is not sufficient and must be supplemented with additional heat release models to capture the entirety of the physics for this experiment.

Combustion instability

riemann solver

linear acoustics

Engineering

Mechanical Engineering

Cyclic Trigonal Riemann Surfaces of Genus 4

Ying, Daniel

January 2004

A closed Riemann surface which can be realized as a 3-sheeted covering of the Riemann sphere is called trigonal, and such a covering is called a trigonal morphism. Accola showed that the trigonal morphism is unique for Riemann surfaces of genus g ≥ 5. This thesis will characterize the Riemann surfaces of genus 4 wiht non-unique trigonal morphism. We will describe the structure of the space of cyclic trigonal Riemann surfaces of genus 4. / <p>Report code: LiU-Tek-Lic-2004:54. The electronic version of the printed licentiate thesis is a corrected version where errors in the calculations have been corrected. See Errata below for a list of corrections.</p>

Riemann surface

trigonal morphism

Accola

genus 4

Mathematics

Matematik