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61	Modelagem computacional do escoamento bifásico em um meio poroso aquecido por ondas eletromagnéticas Taipe, Stiw Harrison Herrera 26 January 2018 (has links) Submitted by Geandra Rodrigues (geandrar@gmail.com) on 2018-03-27T18:18:55Z No. of bitstreams: 1 stiwharrisonherrerataipe.pdf: 5886256 bytes, checksum: 4fa85d1d9808790a2f5c85bb6c6c8d8d (MD5) / Approved for entry into archive by Adriana Oliveira (adriana.oliveira@ufjf.edu.br) on 2018-03-28T16:44:29Z (GMT) No. of bitstreams: 1 stiwharrisonherrerataipe.pdf: 5886256 bytes, checksum: 4fa85d1d9808790a2f5c85bb6c6c8d8d (MD5) / Made available in DSpace on 2018-03-28T16:44:30Z (GMT). No. of bitstreams: 1 stiwharrisonherrerataipe.pdf: 5886256 bytes, checksum: 4fa85d1d9808790a2f5c85bb6c6c8d8d (MD5) Previous issue date: 2018-01-26 / CAPES - Coordenação de Aperfeiçoamento de Pessoal de Nível Superior / Neste trabalho estamos interessados em estudar, mediante simulações computacionais, se o aquecimento eletromagnético é capaz de melhorar o deslocamento do óleo pela água. Nesta direção, nos baseamos nos resultados obtidos pela equipe da TU Delft da Holanda, que desenvolveu experimentos de laboratório que demonstravam a distribuição da temperatura em um meio poroso, onde o óleo está sendo deslocado pela injeção de água, gerada por aquecimento eletromagnético. Para tanto, definimos o modelo matemático que governa o problema em questão regido por equações diferenciais parciais das leis de conservação de massa e energia. Assim, partindo da caracterização do contínuo e estendendo a lei de Darcy para o caso multifásico, através da introdução do conceito de permeabilidades relativas dos fluidos, derivamos um sistema acoplado de equações diferenciais parciais com coeficientes variáveis e termos não lineares formulados em função da velocidade de Darcy para o escoamento bifásico (água, óleo) aquecido por ondas eletromagnéticas. O modelo matemático é discretizado utilizando o método de diferenças finitas no tempo e no espaço e a técnica Splitting. Dessa forma dividimos o sistema de equações diferencias parciais em dois subsistemas. O primeiro subsistema consiste em resolver a parte difusiva e reativa e o segundo subsistema tem por objetivo a resolução do termo convectivo. O método numérico desenvolvido é validado por simulações computacionais que visam a comparação com os resultados obtidos experimentalmente e com soluções semi-analíticas, para este problema, que foram derivadas pelo método do princípio de Duhamel. Além disso, o método proposto quando aplicado para o caso geral da simulação do escoamento bifásico com aquecimento eletromagnético demonstrou um ganho de 1.67%, se comparado ao método sem aquecimento. / In this work we are interested in studying, through computational simulations, if the electromagnetic heating is able to improve the displacement of the oil by water. In this direction, we rely on the results obtained by the TU Delft team from the Netherlands, which developed laboratory experiments that demonstrated the temperature distribution in a porous medium where the oil is being displaced by the injection of water generated by electromagnetic heating. For this, we define the mathematical model that governs the problem in question governed by partial differential equations of the laws of conservation of mass and energy. Thus, starting from the characterization of the continuum and extending Darcy’s law to the multiphase case, by introducing the concept of relative permeabilities of fluids, we derive a coupled system of partial differential equations with variable coefficients and non-linear terms formulated as a function of the velocity of Darcy for two-phase flow (water, oil) heated by electromagnetic waves. The mathematical model is discretized using the finite difference method in time and space and the Splitting technique. In this way we divide the system of partial differential equations into two subsystems. The first subsystem consists of solving the diffusive and reactive part and the second subsystem aims to solve the convective term. The numerical method developed is validated by computational simulations aimed at the comparison with the results obtained experimentally and with semi-analytical solutions, for this problem, which were derived by the Duhamel principle method. In addition, the proposed method when applied to the general case of simulation of the biphasic flow with electromagnetic heating demonstrated a gain of 1.67%, when compared to the non-heating method. CNPQ::CIENCIAS EXATAS E DA TERRA Escoamento em meios porosos Equações diferencias parciais Leis de conservação Escoamento bifásico Aquecimento eletromagnético Porous media Partial differential equation Conservation laws Biphasic flow Electromagnetic heating
62	The numerical approximation to solutions for the double-slip and double-spin model for the deformation and flow of granular materials Mohd Damanhuri, Nor Alisa January 2017 (has links) The aim of this thesis is to develop a numerical method to find approximations to solutions of the double-slip and double-spin model for the deformation and flow of granular materials. The model incorporates the physical and kinematic concepts of yield, shearing motion on slip lines, dilatation and average grain rotation. The equations governing the model comprise a set of five first order partial differential equations for the five dependent variables comprising two stress variables, two velocity components and the density. For steady state flows, the model is hyperbolic and the characteristic directions and relations along the characteristics are presented. The numerical approximation for the rate of working of the stresses are also presented. The model is then applied to a number of granular flow problems using the numerical method. 515
63	Modélisation et Analyse de Modèles en Dynamique Cellulaire avec Applications à des Problèmes Liés aux Cancers / Mathematical modeling in cellular dynamics : applications to cancer research Bourfia, Youssef 28 December 2016 (has links) Cette thèse s’insère dans le cadre général de l’étude de la dynamique des populations. La population prise en compte étant constituée de cellules souches normales et/ou cancéreuses. Nous proposons et analysons trois modèles mathématiques décrivant la dynamique de cellules souches. Le premier modèle proposé est un modèle d’équations aux dérivées partielles structurées en âge que nous transformons, via la méthode des caractéristiques, en un système d'équations différentielles à retard pour lequel on étudie l'existence et la stabilité des points d'équilibres. On effectue, après, des simulations numériques permettant d'illustrer le comportement des états d'équilibres. Dans le deuxième modèle, on considère que la durée du cycle cellulaire dépend de la population totale de cellules quiescentes. La méthode des caractéristiques nous permet de réduire notre modèle structuré en âge à un système d'équations différentielles avec un retard dépendant de l'état pour lequel on effectue une analyse détaillée de la stabilité. Nous confirmons, ensuite, les résultas analytiquement obtenus par des simulations numériques. Pour le troisième et dernier modèle de cette thèse, on propose un système d'équations différentielles ordinaires décrivant la dynamique de cellules souches saines et cancéreuses et prenant en compte leurs interactions avec les réponses immunitaires. Ce modèle nous a permis de souligner l'ampleur de l'impact que peuvent avoir différentes infections sur la prolifération tumoral que ce soit par le biais de leurs fréquences, leurs durées ou la façon dont ils agissent sur le système immunitaire. / This thesis fits into the general framework of the study of population dynamics. The population particularly considered in this work is comprised of stem cells with both cases of healthy and cancerous cells being investigated. We propose and analyze three mathematical models describing stem cells dynamics. The first model is an age-structured partial differential model that we reduce to a delay differential system using the characteristics method. We investigate the existence and stability of the steady states of the reduced delay differential system. We, then, conduct some numerical simulations to illustrate the behavior of the steady states. In the second model, the duration of the cell cycle is considered to depend upon the total population of quiescent cells. The method of characteristics reduces the age-structured model to a system of differentialequations with a state-dependent delay. We perform a detailed stability analysis of the resulting delay differential system. We confirm the analytical results by numerical simulations. The third and final model, proposed in this thesis, is an ordinary differential equations model describing healthy and cancerous stem cells dynamics and their interactions with immune system responses. Through this model, we show that the frequency, the duration of infections and their action (positive or negative) on immune responses may impact significantly tumor proliferation. Dynamique cellulaire Immunosénescence Cancer Équation différentielle à retard Fonction de Lyapunov Cell dynamics Immunosenescence 519.6
64	[pt] DESIGUALDADE DE HARNACK E ESTIMATIVAS DE HOLDER PARA EQUAÇÕES ELÍPTICAS DE SEGUNDA ORDEM / [en] HARNACK S INEQUALITY AND HOLDER ESTIMATES FOR SECOND ORDER ELLIPTICAL EQUATIONS 09 August 2021 (has links) [pt] O objetivo principal desta dissertação é estudar a desigualdade de Harnack e as estimativas de Holder, para um operador elíptico de segunda ordem, na forma não divergente e na forma divergente, respectivamente, sendo os coeficientes funções mensuráveis e limitadas em um domínio ômega contido em Rn. / [en] The main objective of this dissertation is to study Harnack s inequality and Holder s estimates for a second-order elliptic operator, written in the non-divergent form and in the divergent form, respectively, where the coefficient functions are measurable and bounded functions in a domain omega contained in Rn. [pt] EQUACOES DIFERENCIAIS PARCIAIS [pt] EQUACOES ELIPTICAS [pt] ESTIMATIVAS DE HOLDER [pt] DESIGUALDADE DE HARNACK [pt] EDP [en] PARTIAL DIFFERENTIAL EQUATION [en] ELLIPTICAL EQUATION [en] HOLDER ESTIMATE [en] HARNACK S INEQUALITY [en] PDE
65	Quelques exemples de jeux à champ moyen / Some examples of mean field games Coron, Jean-Luc 18 December 2017 (has links) La théorie des jeux à champ moyen fut introduite en 2006 par Jean-Michel Lasry et Pierre-Louis Lions. Elle permet l'étude de la théorie des jeux dans certaines configurations où le nombre de joueurs est trop grand pour espérer une résolution pratique. Nous étudions la théorie des jeux à champ moyen sur les graphes en nous appuyant sur les travaux d'Olivier Guéant que nous étendrons à des formes plus générales d'Hilbertien. Nous étudierons aussi les liens qui existent entres les K-moyennes et les jeux à champ moyen ce qui permettra en principe de proposer de nouveaux algorithmes pour les K-moyennes grâce aux techniques de résolution numérique propres aux jeux à champ moyen. Enfin nous étudierons un jeu à champ moyen à savoir le problème "d'heure de début d'une réunion" en l'étendant à des situations où les agents peuvent choisir entre deux réunions. Nous étudierons de manière analytique et numérique l'existence et la multiplicité des solutions de ce problème. / The mean field game theory was introduced in 2006 by Jean-Michel Lasry and Pierre-Louis Lions. It allows us to study the game theory in some situations where the number of players is too high to be able to be solved in practice. We will study the mean field game theory on graphs by learning from the studies of Oliver Guéant which we will extend to more generalized forms of Hilbertian. We will also study the links between the K-means and the mean field game theory. In principle, this will offer us new algorithms for solving the K-means thanks to the techniques of numerical resolutions of the mean field games. Findly, we will study a mean field game called the "starting time of a meeting". We will extend it to situations where the players can choose between two meetings. We will study analytically and numerically the existence and multiplicity of the solutions to this problem. Théorie des jeux à champ moyen Équations aux dérivées partielles Théorie des graphes K-Moyennes Apprentissage statistique Mean field games theorie Partial differential equation Graph theory K-Means Statistical Learning 519.3
66	Approximation of a Quasilinear Stochastic Partial Differential Equation driven by Fractional White Noise Grecksch, Wilfried, Roth, Christian 16 May 2008 (has links) We approximate the solution of a quasilinear stochastic partial differential equa- tion driven by fractional Brownian motion B_H(t); H in (0,1), which was calculated via fractional White Noise calculus, see [5]. info:eu-repo/classification/ddc/510 ddc:510 Approximation Gebrochene Brownsche Bewegung SPDE fractional Brownian motion white noise
67	Analytical solution of a linear, elliptic, inhomogeneous partial differential equation with inhomogeneous mixed Dirichlet- and Neumann-type boundary conditions for a special rotationally symmetric problem of linear elasticity Eschke, Andy January 2014 (has links) The analytical solution of a given inhomogeneous boundary value problem of a linear, elliptic, inhomogeneous partial differential equation and a set of inhomogeneous mixed Dirichlet- and Neumann-type boundary conditions is derived in the present paper. In the context of elasticity theory, the problem arises for a non-conservative symmetric ansatz and an extended constitutive law shown earlier. For convenient user application, the scalar function expressed in cylindrical coordinates is primarily obtained for the general case before being expatiated on a special case of linear boundary conditions. info:eu-repo/classification/ddc/510 ddc:510
68	Moderní metody řešení eliptických parciálních diferenciálních rovnic / Advanced Eliptic Partial Differential Equations Solution Valenta, Václav January 2009 (has links) Partial differential equations solution and methods for transformation to a large sets of ordinary equations is described in this work. Taylor series method is important for this work. This method needs higher derivatives for correct work. Ways how to compute higher derivatives are also discused in this work.
69	Analytical solution of a linear, elliptic, inhomogeneous partial differential equation in the context of a special rotationally symmetric problem of linear elasticity Eschke, Andy January 2014 (has links) In addition to previous publications, the paper presents the analytical solution of a special boundary value problem which arises in the context of elasticity theory for an extended constitutive law and a non-conservative symmetric ansatz. Besides deriving the general analytical solution, a specific form for linear boundary conditions is given for user convenience. info:eu-repo/classification/ddc/510 ddc:510
70	Applications of the error theory using Dirichlet forms / Application de la théorie d'erreur par formes de Dirichlet Scotti, Simone 16 October 2008 (has links) Cette thèse est consacrée à l'étude des applications de la théorie des erreurs par formes de Dirichlet. Notre travail se divise en trois parties. La première analyse les modèles gouvernés par une équation différentielle stochastique. Après un court chapitre technique, un modèle innovant pour les carnets d’ordres est proposé. Nous considérons que le spread bid-ask n'est pas un défaut, mais plutôt une propriété intrinsèque du marché. L'incertitude est portée par le mouvement Brownien qui conduit l'actif. Nous montrons que l'évolution des spread peut être évaluée grâce à des formules fermées et nous étudions l'impact de l'incertitude du sous-jacent sur les produits dérivés. En suite, nous introduisons le modèle PBS pour le pricing des options européennes. L'idée novatrice est de distinguer la volatilité du marché par rapport au paramètre utilisé par les traders pour se couvrir. Nous assumons la première constante, alors que le deuxième devient une estimation subjective et erronée de la première. Nous prouvons que ce modèle prévoit un spread bid-ask et un smile de volatilité. Les propriétés plus intéressantes de ce modèle sont l’existence de formules fermés pour le pricing, l'impact de la dérive du sous-jacent et une efficace stratégie de calibration. La seconde partie s'intéresse aux modèles décrit par une équation aux dérivées partielles. Les cas linéaire et non-linéaire sont analysés séparément. Dans le premier nous montrons des relations intéressantes entre la théorie des erreurs et celui des ondelettes. Dans le cas non-linéaire nous étudions la sensibilité des solutions à l’aide de la théorie des erreurs. Sauf dans le cas d’une solution exacte, il y a deux approches possibles : on peut d’abord discrétiser l’EDP et étudier la sensibilité du problème discrétisé, soit démontrer que les sensibilités théoriques vérifient des EDP. Les deux cas sont étudiés, et nous prouvons que les sharp et le biais sont solutions d’EDP linéaires dépendantes de la solution de l’EDP originaire et nous proposons des algorithmes pour évaluer numériquement les sensibilités. Enfin, la troisième partie est dédiée aux équations stochastiques aux dérivées partielles. Notre analyse se divise en deux chapitres. D’abord nous étudions la transmission de l’incertitude, présente dans la condition initiale, à la solution de l’EDPS. En suite, nous analysons l'impact d'une perturbation dans les termes fonctionnelles de l’EDPS et dans le coefficient de la fonction de Green associée. Dans le deux cas, nous prouvons que le sharp et le biais sont solutions de deux EDPS linéaires dépendantes de la solution de l’EDPS originaire / This thesis is devoted to the study of the applications of the error theory using Dirichlet forms. Our work is split into three parts. The first one deals with the models described by stochastic differential equations. After a short technical chapter, an innovative model for order books is proposed. We assume that the bid-ask spread is not an imperfection, but an intrinsic property of exchange markets instead. The uncertainty is carried by the Brownian motion guiding the asset. We find that spread evolutions can be evaluated using closed formulae and we estimate the impact of the underlying uncertainty on the related contingent claims. Afterwards, we deal with the PBS model, a new model to price European options. The seminal idea is to distinguish the market volatility with respect to the parameter used by traders for hedging. We assume the former constant, while the latter volatility being an erroneous subjective estimation of the former. We prove that this model anticipates a bid-ask spread and a smiled implied volatility curve. Major properties of this model are the existence of closed formulae for prices, the impact of the underlying drift and an efficient calibration strategy. The second part deals with the models described by partial differential equations. Linear and non-linear PDEs are examined separately. In the first case, we show some interesting relations between the error and wavelets theories. When non-linear PDEs are concerned, we study the sensitivity of the solution using error theory. Except when exact solution exists, two possible approaches are detailed: first, we analyze the sensitivity obtained by taking “derivatives” of the discrete governing equations. Then, we study the PDEs solved by the sensitivity of the theoretical solutions. In both cases, we show that sharp and bias solve linear PDE depending on the solution of the former PDE itself and we suggest algorithms to evaluate numerically the sensitivities. Finally, the third part is devoted to stochastic partial differential equations. Our analysis is split into two chapters. First, we study the transmission of an uncertainty, present on starting conditions, on the solution of SPDE. Then, we analyze the impact of a perturbation of the functional terms of SPDE and the coefficient of the related Green function. In both cases, we show that the sharp and bias verify linear SPDE depending on the solution of the former SPDE itself / Questa tesi é dedicata allo studio delle applicazioni della teoria degli errori tramite forme di Dirichlet, il nostro lavoro si divide in tre parti. Nella prima vengono studiati i modelli descritti da un’equazione differenziale stocastica: dopo un breve capitolo con risultati tecnici viene descritto un modello innovativo per i libri d’ordini. La presenza dei differenziali denarolettera viene considerata non come un’imperfezione, bensi una proprietà intrinseca dei mercati. L’incertezza viene descritta come un rumore sul moto Browniano sottostante all’azione; dimostriamo che l’evoluzione di questi differenziali puó essere valutata attraverso formule chiuse e stimiamo l’impatto dell’incertezza del sottostante sui prodotti derivati. In seguito proponiamo un nuovo modello, chiamato PBS, per il prezzaggio delle opzioni di tipo europeo: l’idea innovativa consiste nel distinguere la volatilità di mercato dal parametro usato dai trader per la copertura. Noi supponiamo la prima constante, mentre il secondo diventa una stima soggettiva ed erronea della prima. Dimostriamo che questo modello prevede dei differenziali lettera-denaro e uno smile di volatilità implicita. Le maggiori proprietà di questo modello sono l’esistenza di formule chiuse per il princing, l’impatto del drift del sottostante e un’efficace strategia per la calibrazione. La seconda parte è dedicata allo studio dei modelli descritti da delle equazioni alle derivate perziali. I casi lineare e non-lineare sono trattati separatamente. Nel primo caso mostriamo interessanti relazioni tra la teoria degli errori e quella delle wavelets. Nel caso delle EDP non-lineari studiamo la sensibilità della soluzione usando la teoria degli errori. Due possibili approcci esistono, salvo quando la soluzione è esplicita. Possiamo prima discretizzare il problema e studiare la sensibilità delle equazioni discretizzate, oppure possiamo dimostrare che le sensibilità teoriche verificano, a loro volta, delle EDP dipendenti dalla soluzione della EDP iniziale. Entrambi gli approcci sono descritti e vengono proposti degli algoritmi per valutare le sensibilità numericamente. Infine, la terza parte è dedicata ai modelli descritti da un’equazione stocastica alle derivate parziali. La nostra analisi é divisa in due capitoli. Nel primo viene studiato l’impatto di un’incertezza, presente nella condizione iniziale, sulla soluzione dell’EDPS, nella seconda si analizzano gli impatti di una perturbazione dei termini funzionali dell’EDPS del coefficiente della funzione di Green associata. In entrambi i casi dimostriamo che lo sharp e la discrepanza sono soluzioni di due EDPS lineari dipendenti dalla soluzione dell’EDPS iniziale Calcul d’erreur Dirichlet, Formes de Opérateur carré du champ Biais Sensibilité Equations différentielles stochastiques Modèles financières Modèles de liquidité Equations aux dérivées partielles EDP non-linéaires Error calculus financial model Dirichlet form Bias Sensitivity Stochastic differential equation Financial model Liquidity model Bid-ask spread Partial differential equation Non-linear PDE Stochastic partial differential equation

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