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An Examination Of The Effectiveness Of The Adomian Decomposition Method In Fluid Dynamic ApplicationsHolmquist, Sonia 01 January 2007 (has links)
Since its introduction in the 1980's, the Adomian Decomposition Method (ADM) has proven to be an efficient and reliable method for solving many types of problems. Originally developed to solve nonlinear functional equations, the ADM has since been used for a wide range of equation types (like boundary value problems, integral equations, equations arising in flow of incompressible and compressible fluids etc...). This work is devoted to an evaluation of the effectiveness of this method when used for fluid dynamic applications. In particular, the ADM has been applied to the Blasius equation, the Falkner-Skan equation, and the Orr-Sommerfeld equation. This study is divided into five Chapters and an Appendix. The first chapter is devoted to an introduction of the Adomian Decomposition method (ADM) with simple illustrations. The Second Chapter is devoted to the application of the ADM to generalized Blasius Equation and our result is compared to other published results when the parameter values are appropriately set. Chapter 3 presents the solution generated for the Falkner-Skan equation. Finally, the Orr-Sommerfeld equation is dealt with in the fourth Chapter. Chapter 5 is devoted to the findings and recommendations based on this study. The Appendix contains details of the solutions considered as well as an alternate solution for the generalized Blasius Equation using Bender's delta-perturbation method.
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THE EFFECT OF MINIMUM WAGE ON U.S. LABOR PRODUCTIVITY 1997-2013: THE HIGHER, THE BETTER?Pham, Tam Hong Thanh 27 July 2015 (has links)
No description available.
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Implementation and Verification of the Subgroup Decomposition Method in the TITAN 3-D Deterministic Radiation Transport CodeRoskoff, Nathan J. 04 June 2014 (has links)
The subgroup decomposition method (SDM) has recently been developed as an improvement over the consistent generalized energy condensation theory for treatment of the energy variable in deterministic particle transport problems. By explicitly preserving reaction rates of the fine-group energy structure, the SDM directly couples a consistent coarse-group transport calculation with a set of fixed-source "decomposition sweeps" to provide a fine-group flux spectrum. This paper will outline the implementation of the SDM into the three-dimensional, discrete ordinates (SN) deterministic transport code TITAN. The new version of TITAN, TITAN-SDM, is tested using 1-D and 2-D benchmark problems based on the Japanese designed High Temperature Engineering Test Reactor (HTTR). In addition to accuracy, this study examines the efficiency of the SDM algorithm in a 3-D SN transport code. / Master of Science
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Decomposition Of Elastic Constant Tensor Into Orthogonal PartsDinckal, Cigdem 01 August 2010 (has links) (PDF)
All procedures in the literature for decomposing symmetric second rank (stress) tensor and symmetric fourth rank (elastic constant) tensor are elaborated and compared which have many engineering and scientific applications
for anisotropic materials. The decomposition methods for symmetric second rank tensors are orthonormal tensor basis method, complex variable representation and spectral method. For symmetric fourth rank (elastic constant)
tensor, there are four mainly decomposition methods namely as, orthonormal tensor basis, irreducible, harmonic decomposition and spectral. Those are
applied to anisotropic materials possessing various symmetry classes which are isotropic, cubic, transversely isotropic, tetragonal, trigonal and orthorhombic.
For isotropic materials, an expression for the elastic constant tensor different than the traditionally known form is given. Some misprints found in the literature are corrected.
For comparison purposes, numerical examples of each decomposition process are presented for the materials possessing different symmetry classes. Some
applications of these decomposition methods are given. Besides, norm and norm ratio concepts are introduced to measure and compare the anisotropy degree for
various materials with the same or di¤ / erent symmetries. For these materials,norm and norm ratios are calculated. It is suggested that the norm of a tensor may be used as a criterion for comparing the overall e¤ / ect of the properties
of anisotropic materials and the norm ratios may be used as a criterion to represent the anisotropy degree of the properties of materials.
Finally, comparison of all methods are done in order to determine similarities and differences between them. As a result of this comparison process, it is
proposed that the spectral method is a non-linear decomposition method which yields non-linear orthogonal decomposed parts. For symmetric second rank
and fourth rank tensors, this case is a significant innovation in decomposition procedures in the literature.
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Complex question answering : minimizing the gaps and beyondHasan, Sheikh Sadid Al January 2013 (has links)
Current Question Answering (QA) systems have been significantly advanced in demonstrating
finer abilities to answer simple factoid and list questions. Such questions are easier
to process as they require small snippets of texts as the answers. However, there is
a category of questions that represents a more complex information need, which cannot
be satisfied easily by simply extracting a single entity or a single sentence. For example,
the question: “How was Japan affected by the earthquake?” suggests that the inquirer is
looking for information in the context of a wider perspective. We call these “complex questions”
and focus on the task of answering them with the intention to minimize the existing
gaps in the literature.
The major limitation of the available search and QA systems is that they lack a way of
measuring whether a user is satisfied with the information provided. This was our motivation
to propose a reinforcement learning formulation to the complex question answering
problem. Next, we presented an integer linear programming formulation where sentence
compression models were applied for the query-focused multi-document summarization
task in order to investigate if sentence compression improves the overall performance.
Both compression and summarization were considered as global optimization problems.
We also investigated the impact of syntactic and semantic information in a graph-based
random walk method for answering complex questions. Decomposing a complex question
into a series of simple questions and then reusing the techniques developed for answering
simple questions is an effective means of answering complex questions. We proposed a
supervised approach for automatically learning good decompositions of complex questions
in this work. A complex question often asks about a topic of user’s interest. Therefore, the
problem of complex question decomposition closely relates to the problem of topic to question
generation. We addressed this challenge and proposed a topic to question generation
approach to enhance the scope of our problem domain. / xi, 192 leaves : ill. ; 29 cm
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Fuzzy rule base identification via singular value decomposition. / CUHK electronic theses & dissertations collection / Digital dissertation consortiumJanuary 1999 (has links)
by Stephen Chi-tin Yang. / "Sept. 28, 1999." / Thesis (Ph.D.)--Chinese University of Hong Kong, 1999. / Includes bibliographical references (p. 158-163). / Electronic reproduction. Hong Kong : Chinese University of Hong Kong, [2012] System requirements: Adobe Acrobat Reader. Available via World Wide Web. / Electronic reproduction. Ann Arbor, MI : ProQuest Information and Learning Company, [200-] System requirements: Adobe Acrobat Reader. Available via World Wide Web. / Mode of access: World Wide Web. / Abstracts in English and Chinese.
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Modelagem da dispersão de poluentes na atmosfera considerando o perfil de vento e os coeficientes de difusão dependentes do tempoSilva, Everson Jonatha Gomes da January 2016 (has links)
Esta tese tem o objetivo de apresentar um modelo matemático, para simular a dispersão de poluentes na atmosfera, que considera a variação temporal do campo de vento e dos coeficientes de difusão turbulenta, além disso, representar uma fonte móvel através de fontes pontuais. Sendo assim, usa-se a ideia do método da decomposição de Adomian e a técnica GILTT (Generalized Integral Laplace Transform Technique) no intuito de resolver a equação de advecção difusão, a qual descreve o fenômeno citado. Ainda, implementa-se o modelo proposto com o conjunto de dados do experimento de OLAD (Over Land Alongwind Dispersion) e, por fim, comparam-se os resultados obtidos e os dados de concentração coletados no experimento mencionado. / This thesis aims to present a mathematical model to simulate the dispersion of pollutants in the atmosphere, which considers the temporal variation of the wind field and the eddy diffusivity. Moreover, it represents a moving source through point sources. To reach this goal, it uses the idea of the Adomian decomposition method together with the GILTT technique (Generalized Integral Laplace Transform Technique) in order to solve the advection-diffusion equation, which describes the phenomenon. It further implements the model proposed with the dataset of OLAD (Dispersion Over Land Alongwind) experiment and finally the results obtained and the concentration observed are compared.
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Hierarchical control and decomposition of decentralized linear stochastic systemsLooze, Douglas P January 1978 (has links)
Thesis. 1978. Ph.D.--Massachusetts Institute of Technology. Dept. of Electrical Engineering and Computer Science. / Vita. / Bibliography: leaves 206-211. / by Douglas P. Looze. / Ph.D.
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A new development in domain decomposition techniques for analysis of plates with mixed edge supportsSu, G. H., University of Western Sydney, Nepean, School of Civic Engineering and Environment January 2000 (has links)
The importance of plates, with discontinuities in boundary supports in aeronautical and marine structures, have led to various techniques to solve plate problems with mixed edge support conditions. The domain decomposition method is one of the most effective of these techniques, providing accurate numerical solutions. This method is used to investigate the vibration and buckling of flat, isotropic, thin and elastic plates with mixed edge support conditions. Two practical approaches have been developed as an extension of the domain decomposition method, namely, the primary-secondary domain (PSD) approach and the line-domains (LD) approach. The PSD approach decomposes a plate into one primary domain and one/two secondary domain(s). The LD approach considers interconnecting boundaries as dominant domains whose basic functions take a higher edge restraint from the neighbouring edges. Convergence and comparison studies are carried out on a number of selected rectangular plate cases. Extensive practical plate problems with various shapes, combinations of mixed boundary conditions and different inplane loading conditions have been solved by the PSD and LD approaches. / Master of Engineering (Hons)
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Spectral Integral Method and Spectral Element Method Domain Decomposition Method for Electromagnetic Field AnalysisLin, Yun January 2011 (has links)
<p>In this work, we proposed a spectral integral method (SIM)-spectral element method (SEM)- finite element method (FEM) domain decomposition method (DDM) for solving inhomogeneous multi-scale problems. The proposed SIM-SEM-FEM domain decomposition algorithm can efficiently handle problems with multi-scale structures, </p><p>by using FEM to model electrically small sub-domains and using SEM to model electrically large and smooth sub-domains. The SIM is utilized as an efficient boundary condition. This combination can reduce the total number of elements used in solving multi-scale problems, thus it is more efficient than conventional FEM or conventional FEM domain decomposition method. Another merit of the proposed method is that it is capable of handling arbitrary non-conforming elements. Both geometry modeling and mesh generation are totally independent for different sub-domains, thus the geometry modeling and mesh generation are highly flexible for the proposed SEM-FEM domain decomposition method. As a result, the proposed SIM-SEM-FEM DDM algorithm is very suitable for solving inhomogeneous multi-scale problems.</p> / Dissertation
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