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181	Investigation of the scalar variance and scalar dissipation rate in URANS and LES Ye, Isaac Keeheon January 2011 (has links) Large-eddy simulation (LES) and unsteady Reynolds-averaged Navier-Stokes (URANS) calculations have been performed to investigate the effects of different mathematical models for scalar variance and its dissipation rate as applied to both a non-reacting bluff-body turbulent flow and an extension to a reacting case. In the conserved scalar formalism, the mean value of a thermo-chemical variable is obtained through the PDF-weighted integration of the local description over the conserved scalar, the mixture fraction. The scalar variance, one of the key parameters for the determination of a presumed β-function PDF, is obtained by solving its own transport equation with the unclosed scalar dissipation rate modelled using either an algebraic expression or a transport equation. The proposed approach is first applied to URANS and then extended to LES. Velocity, length and time scales associated with the URANS modelling are determined using the standard two-equation k-ε transport model. In contrast, all three scales required by the LES modelling are based on the Smagorinsky subgrid scale (SGS) algebraic model. The present study proposes a new algebraic and a new transport LES model for the scalar dissipation rate required by the transport equation for scalar variance, with a time scale consistent with the Smagorinsky SGS model. Large Eddy Simulation Scalar variance Unsteady Reynolds-Averaged Simulation Scalar dissipation rate Turbulent channel flow Parallel computing Combustion Bluff-body turbulent flow Message Passing Interface Finite Volume Method Laminar flamelet model Chemical equilibrium model Mechanical Engineering
182	Hipersuperfícies com curvatura média constante e hipersuperfícies com curvatura escalar constante na esfera. / Hypersurfaces with constant mean curvature and hypersurfaces with constant scalar in curvature sphere. Jesus, Isadora Maria de 04 August 2009 (has links) In this work we prove two theorems that characterize the hypersurfaces in the unitary sphere of dimension n+1. The first result, obtained by H. Alencar and M. do Carmo, classifies hypersurfaces with constant mean curvature in the sphere. This result was published in April 1994 in Proceedings of The American Mathematical Society, volume 120, number 4 with the title Hypersurfaces with Constant Mean Curvature. The second result was obtained by Li Haizhong in the article Hypersurfaces with Constant Scalar Curvature in Space Forms, published in 1996 in the journal Mathematisch Annalen, volume 305. The theorem of Li Haizhong characterizes hypersurfaces with constant scalar curvature in the sphere. We prove the theorem of Li Haizhong using the results obtained by H. Alencar and M. do Carmo. / Conselho Nacional de Desenvolvimento Científico e Tecnológico / Nesta dissertação apresentamos dois teoremas que caracterizam as hipersuperfícies na esfera unitária de dimensão n+1. O primeiro resultado, obtido por H. Alencar e M. do Carmo, classifica as hipersuperfícies com curvatura média constante na esfera. Este resultado foi publicado em abril de 1994 no Proceedings of The American Mathematical Society, volume 120, número 4 com o título Hypersurfaces With Constant Mean Curvature.O segundo resultado provado nesta dissertação foi obtido por Li Haizhong no artigo Hypersurfaces With Constant Scalar Curvature in Spaces Forms, publicado em 1996 no Mathematische Annalen, volume 305. O Teorema de Li Haizhong caracteriza as hipersuperfícies com curvatura escalar constante na esfera. Demonstraremos o Teorema de Li Haizhong utilizando os resultados obtidos por H. Alencar e M. do Carmo. Geometria diferencial Curvatura media Curvatura scalar Hipersuperfície Laplaciano Alencar do Carmo, teorema de Li Haizhong, teorema de Differential geometry Mean curvature Scalar curvature Hypersurfaces Laplacian Alencar and do Carmo s, theorem Li Haizhong s, theorem
183	Compact almost Ricci soliton, critical metrics of the total scalar curvature functional and p-fundamental tone estimates / Compact almost Ricci soliton, critical metrics of the total scalar curvature functional and p-fundamental tone estimates Evangelista, Israel de Sousa 04 July 2017 (has links) EVANGELISTA, I. S. Compact almost Ricci soliton, critical metrics of the total scalar curvature functional and p-fundamental tone estimates. 2017. 75 f. Tese (Doutorado em Matemática) – Centro de Ciências, Universidade Federal do Ceará, Fortaleza, 2017. / Submitted by Andrea Dantas (pgmat@mat.ufc.br) on 2017-07-10T12:41:32Z No. of bitstreams: 1 2017_tese_isevangelista.pdf: 618771 bytes, checksum: 7e4bb8d9fd8825ef347e309171075037 (MD5) / Approved for entry into archive by Rocilda Sales (rocilda@ufc.br) on 2017-07-10T14:06:18Z (GMT) No. of bitstreams: 1 2017_tese_isevangelista.pdf: 618771 bytes, checksum: 7e4bb8d9fd8825ef347e309171075037 (MD5) / Made available in DSpace on 2017-07-10T14:06:18Z (GMT). No. of bitstreams: 1 2017_tese_isevangelista.pdf: 618771 bytes, checksum: 7e4bb8d9fd8825ef347e309171075037 (MD5) Previous issue date: 2017-07-04 / The present thesis is divided in three different parts. The aim of the ﬁrst part is to prove that a compact almost Ricci soliton with null Cotton tensor is isometric to a standard sphere provided one of the following conditions associated to the Schouten tensor holds: the second symmetric function is constant and positive; two consecutive symmetric functions are non null multiple or some symmetric function is constant and the quoted tensor is positive. The aim of the second part is to study the critical metrics of the total scalar curvature funcional on compact manifolds with constant scalar curvature and unit volume, for simplicity, CPE metrics. It has been conjectured that every CPE metric must be Einstein. We prove that the Conjecture is true for CPE metrics under a suitable integral condition and we also prove that it sufﬁces the metric to be conformal to an Einstein metric. In the third part we estimate the p-fundamental tone of submanifolds in a Cartan-Hadamard manifold. First we obtain lower bounds for the p-fundamental tone of geodesic balls and submanifolds with bounded mean curvature. Moreover, we provide the p-fundamental tone estimates of minimal submanifolds with certain conditions on the norm of the second fundamental form. Finally, we study transversely oriented codimension one C 2-foliations of open subsets Ω of Riemannian manifolds M and obtain lower bounds estimates for the inﬁmum of the mean curvature of the leaves in terms of the p-fundamental tone of Ω. / A presente tese está dividida em três partes diferentes. O objetivo da primeira parte é provar que um quase soliton de Ricci compacto com tensor de Cotton nulo é isométrico a uma esfera canônica desde que uma das seguintes condições associadas ao tensor de Schouten seja válida: a segunda função simétrica é constante e positiva; duas funções simétricas consecutivas são múltiplas, não nulas, ou alguma função simétrica é constante e o tensor de Schouten é positivo. O objetivo da segunda parte é estudar as métricas críticas do funcional curvatura escalar total em variedades compactas com curvatura escalar constante e volume unitário, por simplicidade, métricas CPE. Foi conjecturado que toda métrica CPE deve ser Einstein. Prova-se que a conjectura é verdadeira para as métricas CPE sob uma condição integral adequada e também se prova que é suﬁciente que a métrica seja conforme a uma métrica Einstein. Na terceira parte, estima-se o p-tom fundamental de subvariedades em uma variedade tipo Cartan-Hadamard. Primeiramente, obtém-se estimativas por baixo para o p-tom fundamental de bolas geodésicas e em subvariedades com curvatura média limitada. Além disso, obtém-se estimativas do p-tom fundamental de subvariedades mínimas com certas condições sobre a norma da segunda forma fundamental. Por ﬁm, estudam-se folheações de classe C 2 transversalmente orientadas de codimensão 1 de subconjuntos abertos Ω de variedades riemannianas M e obtêm-se estimativas por baixo para o ínﬁmo da curvatura média das folhas em termos do p-tom fundamental de Ω. Almost Ricci soliton Total scalar curvature functional P-Laplacian P-fundamental tone Einstein metrics Scalar curvature Cotton tensor Quase soliton de Ricci Funcional curvatura escalar total total P-laplaciano P-tom fundamental Métricas de Einstein Curvatura escalar Tensor de cotton
184	Scale-Space Methods as a Means of Fingerprint Image Enhancement / Skalrymdsmetoder som förbättring av fingeravtrycksbilder Larsson, Karl January 2004 (has links) The usage of automatic fingerprint identification systems as a means of identification and/or verification have increased substantially during the last couple of years. It is well known that small deviations may occur within a fingerprint over time, a problem referred to as template ageing. This problem, and other reasons for deviations between two images of the same fingerprint, complicates the identification/verification process, since distinct features may appear somewhat different in the two images that are matched. Commonly used to try and minimise this type of problem are different kinds of fingerprint image enhancement algorithms. This thesis tests different methods within the scale-space framework and evaluate their performance as fingerprint image enhancement methods. The methods tested within this thesis ranges from linear scale-space filtering, where no prior information about the images is known, to scalar and tensor driven diffusion where analysis of the images precedes and controls the diffusion process. The linear scale-space approach is shown to improve correlation values, which was anticipated since the image structure is flattened at coarser scales. There is however no increase in the number of accurate matches, since inaccurate features also tends to get higher correlation value at large scales. The nonlinear isotropic scale-space (scalar dependent diffusion), or the edge- preservation, approach is proven to be an ill fit method for fingerprint image enhancement. This is due to the fact that the analysis of edges may be unreliable, since edge structure is often distorted in fingerprints affected by the template ageing problem. The nonlinear anisotropic scale-space (tensor dependent diffusion), or coherence-enhancing, method does not give any overall improvements of the number of accurate matches. It is however shown that for a certain type of template ageing problem, where the deviating structure does not significantly affect the ridge orientation, the nonlinear anisotropic diffusion is able to accurately match correlation pairs that resulted in a false match before they were enhanced. Datorteknik fingerprint template aging correlation image enhancement scale-space Gaussian scale-space linear scale-space nonlinear isotropic scale-space nonlinear anisotropic scale-space diffusion scalar driven diffusion scalar dependent diffusion tensor driven diffusion tensor dependent diffusion Datorteknik Computer Engineering Datorteknik
185	Energy conditions and scalar field cosmology Westmoreland, Shawn January 1900 (has links) Master of Science / Department of Physics / Bharat Ratra / In this report, we discuss the four standard energy conditions of General Relativity (null, weak, dominant, and strong) and investigate their cosmological consequences. We note that these energy conditions can be compatible with cosmic acceleration provided that a repulsive cosmological constant exists and the acceleration stays within certain bounds. Scalar fields and dark energy, and their relationships to the energy conditions, are also discussed. Special attention is paid to the 1988 Ratra-Peebles scalar field model, which is notable in that it provides a physical self-consistent framework for the phenomenology of dark energy. Appendix B, which is part of joint-research with Anatoly Pavlov, Khaled Saaidi, and Bharat Ratra, reports on the existence of the Ratra-Peebles scalar field tracker solution in a curvature-dominated universe, and discusses the problem of investigating the evolution of long-wavelength inhomogeneities in this solution while taking into account the gravitational back-reaction (in the linear perturbative approximation). General Relativity Cosmology Scalar fields Energy conditions Dark energy Cosmological constant Astronomy (0606) Astrophysics (0596) Theoretical Physics (0753)
186	ADAPTIVE SIGNAL DEGRADATION INDICATION (SDI) FOR DIVERSITY BRANCH SELECTION (DBS) Laird, Daniel T. 10 1900 (has links) International Telemetering Conference Proceedings / October 20-23, 2003 / Riviera Hotel and Convention Center, Las Vegas, Nevada / One of several methods currently under investigation to increase telemetry efficiency is channel diversity selection. A spatial technique we are exploring exploits a signal quality indicator of phase demodulation to select ‘competing’ telemetry channels sourced by antenna separated by fractional wavelengths. The Advanced Range Telemetry (ARTM) program, a Centralized Test and Evaluation Improvement Program (CTEIP) research project funded by the Office of the Secretary of Defense (OSD), recently investigated three switching criteria for a multiple antenna system. This paper will discuss an algorithm that controls channel selection, or diversity branch selection (DBS), using a combination of the techniques investigated. channel-basis channel-switch bivector trivector multivector cliffor pseudo-scalar threshold functional Kalman gain variance diffusion filter
187	Adiabatic and entropy perturbations in cosmology Gordon, Christopher January 2001 (has links) No description available. 523.01
188	Parallelizable manifold compactifications of D=11 Supergravity Goranci, Roberto January 2016 (has links) In this thesis we present solutions of spontaneous compactifications of D=11, N=1 supergravity on parallelizable manifolds S^1, S^3 and S^7. In Freund-Rubin compactifications one usually obtains AdS vacua in 4D, these solutions usually sets the fermionic VEV's to zero. However giving them non zero VEV's allows us to define torsion given by the fermionic bilinears that essentially flattens the geometry giving us a vanishing cosmological constant on M_4. We further give an analysis of the consistent truncation of the bosonic sector of D=11 supergravity on a S^3 manifold and relate this to other known consistent truncation compactifications. We also consider the squashed S^7 where we check for surviving supersymmetries by analyzing the generalised holonomy, this compactification is of interest in phenomenology. Supergravity Compactification Freund-Rubin Parallelizable manifold Fermion condensate Holonomy Scalar coset squashed seven-sphere Consistent truncations Domain Walls Membrane
189	Sur une classe de structures kählériennes généralisées toriques Boulanger, Laurence 04 1900 (has links) Cette thèse concerne le problème de trouver une notion naturelle de «courbure scalaire» en géométrie kählérienne généralisée. L'approche utilisée consiste à calculer l'application moment pour l'action du groupe des difféomorphismes hamiltoniens sur l'espace des structures kählériennes généralisées de type symplectique. En effet, il est bien connu que l'application moment pour la restriction de cette action aux structures kählériennes s'identifie à la courbure scalaire riemannienne. On se limite à une certaine classe de structure kählériennes généralisées sur les variétés toriques notée $DGK_{\omega}^{\mathbb{T}}(M)$ que l'on reconnaît comme étant classifiées par la donnée d'une matrice antisymétrique $C$ et d'une fonction réelle strictement convexe $\tau$ (ayant un comportement adéquat au voisinage de la frontière du polytope moment). Ce point de vue rend évident le fait que toute structure kählérienne torique peut être déformée en un élément non kählérien de $DGK_{\omega}^{\mathbb{T}}(M)$, et on note que cette déformation à lieu le long d'une des classes que R. Goto a démontré comme étant libre d'obstruction. On identifie des conditions suffisantes sur une paire $(\tau,C)$ pour qu'elle donne lieu à un élément de $DGK_{\omega}^{\mathbb{T}}(M)$ et on montre qu'en dimension 4, ces conditions sont également nécessaires. Suivant l'adage «l'application moment est la courbure» mentionné ci-haut, des formules pour des notions de «courbure scalaire hermitienne généralisée» et de «courbure scalaire riemannienne généralisée» (en dimension 4) sont obtenues en termes de la fonction $\tau$. Enfin, une expression de la courbure scalaire riemannienne généralisée en termes de la structure bihermitienne sous-jacente est dégagée en dimension 4. Lorsque comparée avec le résultat des physiciens Coimbra et al., notre formule suggère un choix canonique pour le dilaton de leur théorie. / This thesis is about the problem of finding a natural notion of "scalar curvature" in generalized Kähler geometry. The approach taken here is to compute the moment map for the action of the group of hamiltonian diffeomorphisms on the space of generalized Kähler structures of symplectic type. Indeed, it is well known that the moment map for the restriction of this action to the space of ordinary Kähler structures can be naturally identified with the riemannian scalar curvature. We concern ourselves only with a certain class of generalized Kähler structures on toric manifolds which we denote by $DGK_{\omega}^{\mathbb{T}}(M)$ and which we recognize as being classified by the data of an antisymetric matrix $C$ and a real-valued strictly convex functions $\tau$ (exhibiting appropriate behavior on a neighborhood of the boundary of the moment polytope). This viewpoint makes obvious the fact that any toric Kähler structure can be deformed to a non-Kähler element of $DGK_{\omega}^{\mathbb{T}}(M)$, and we note that this deformation happens along one of the classes which were shown by R. Goto to be unobstructed. We identify sufficient conditions on a pair $(\tau,C)$ for it to define an element of $DGK_{\omega}^{\mathbb{T}}(M)$ and we show that in dimension 4, these conditions are also necessary. Following the adage "the moment map is the curvature" mentioned above, formulas for notions of "generalized Hermitian scalar curvature" and "generalized Riemannian scalar curvature" (in dimension 4) are obtained in terms of the function $\tau$. Finally, an expression for the generalized Riemannian scalar curvature in terms of the underlying bi-Hermitian structure is found in dimension 4. When compared with the results of the physicists Coimbra et al., our formula suggests a canonical choice for the dilaton of their theory. Géométrie kählérienne généralisée Géométrie torique Courbure scalaire Generalized Kähler geometry Toric geometry Scalar curvature
190	Black holes, instability and scalar-tensor gravity / Buracos negros, instabilidade e gravidade escalar-tensorial Console, Felipe de Carvalho Ceregatti de 25 February 2019 (has links) In this work, we review three topics which are relevant on its own but which are also interconnected through the AdS/CFT correspondence: (i) black holes in AdS and its thermodynamics, (ii) nonlinear instability of AdS and (iii) scalar- tensor theory of gravity. Each one of these topics find applications in holography using the above mentioned correspondence. We review the various coordinate systems used to write the AdS metric and discuss the main black holes with AdS asymptotics as well as their thermodynamical properties. We also review current results on linear and nonlinear stability for various spacetimes, presenting a heuristic explanation for the nonlinear instability of AdS. The discussion about alternative theories of gravity is restricted to the case of scalar-tensor theories (Horndeski theories, specially). We study the multipole expansion of the electromagnetic field in the solitonic background of a shift-symmetric scalar-tensor model (up to second order in the scalar field coupling constant with the Gauss-Bonnet term). We find that the multipoles are everywhere regular and finite except for the monopole l = 0, which diverges at the origin of the spacetime coordinates. / Neste trabalho, temos como objetivo fazer uma revisão sobre três temas de grande relevância por si só mas, que também se interligam através da correspondencia AdS/CFT: (i) buracos negros em AdS e sua termodinâmica, (ii) a instabilidade não-linear de AdS e (iii) teorias escalar-tensoriais da gravidade. Cada um destes temas encontram aplicações em holografia usando a correspondencia citada acida. Revisamos as diversas formas de escrever a métrica de AdS e discutimos os principais buracos negros assintóticamentes AdS assim como suas propriedades termodinâmicas. Nós também revisamos os resultados atuais sobre a estabilidade linear e não-linear para diversos espaços-tempos, reproduzindo uma explicação heurísitca sobre a instabilidade não-linear do espaço-tempo AdS. A discussão das teorias alternativas à Relatividade Geral é restrita ao caso das teorias escalar-tensorias da gravidade (a teoria de Horndeski, especialmente). Nós estudamos a expansão multipolar do campo electromagnético em um espaço-tempo que é solução do modelo \"shift-symmetric scalar tensor gravity\" (até segunda ordem na constante de acoplamento do campo escalar com o termo de Gauss-Bonnet) com características solitônicas. Encontramos que os multipolos são regulares e finitos em todo espaço-tempo com exceção do monopolo l = 0, que diverge na origem do sistema de coordenadas. Anti-de Sitter spacetime Black holes Buracos negros Espaço-tempo Anti-de Sitter Estabilidade Gravidade escalar-tensorial Scalar-Tensor gravity Stability

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