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Academic literature on the topic 'Thin set'

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Published: 4 June 2021

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Journal articles on the topic "Thin set"

ALON, NOGA, EMANUELA FACHINI, and JÁNOS KÖRNER. "Locally Thin Set Families." Combinatorics, Probability and Computing 9, no. 6 (November 2000): 481–88. http://dx.doi.org/10.1017/s0963548300004521.

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A family of subsets of an n-set is k-locally thin if, for every k of its member sets, the ground set has at least one element contained in exactly 1 of them. We derive new asymptotic upper bounds for the maximum cardinality of locally thin set families for every even k. This improves on previous results of two of the authors with Monti.

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Kanatzidis, Mercouri G. "Quick-set thin films." Nature 428, no. 6980 (March 2004): 269–71. http://dx.doi.org/10.1038/428269a.

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Cholak, Peter, and Ludovic Patey. "Thin set theorems and cone avoidance." Transactions of the American Mathematical Society 373, no. 4 (January 7, 2020): 2743–73. http://dx.doi.org/10.1090/tran/7987.

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Ziemkiewicz, David, Karol Karpiński, and Sylwia Zielińska-Raczyńska. "Fractal Plasmons on Cantor Set Thin Film." Entropy 21, no. 12 (November 29, 2019): 1176. http://dx.doi.org/10.3390/e21121176.

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The propagation of surface plasmon–polaritons is investigated in a metallic, fractal-like structure based on Cantor set. The dynamic of plasmonic modes generating on the Cantor structure is discussed in the context of the setup geometry. The numerically obtained reflection spectra are analyzed with the box-counting method to obtain their dimension, which is shown to be dependent on the geometry of the plasmonic structure. The entropy of the structure is also calculated and shown to be proportional to the dimension. Presented analysis allows for extracting information about fractal plasmonic structure from the reflectance spectrum. Predictions regarding the experimental observation of discussed effects are presented.

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Spaepen, Frans. "Viewpoint set artificially layer thin films foreword." Scripta Metallurgica 20, no. 4 (April 1986): 441–42. http://dx.doi.org/10.1016/0036-9748(86)90233-4.

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DAGANI, RON. "New Milestones Set with Bulk, Thin-Film Superconductors." Chemical & Engineering News 67, no. 46 (November 13, 1989): 22–23. http://dx.doi.org/10.1021/cen-v067n046.p022.

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Rice, Brian. "The Thin Set Theorem for Pairs Implies DNR." Notre Dame Journal of Formal Logic 56, no. 4 (2015): 595–601. http://dx.doi.org/10.1215/00294527-3153606.

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FACHINI, EMANUELA, JÁNOS KÖRNER, and ANGELO MONTI. "Self-Similarity Bounds for Locally Thin Set Families." Combinatorics, Probability and Computing 10, no. 4 (July 2001): 309–15. http://dx.doi.org/10.1017/s0963548301004667.

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A family of subsets of an n-set is k-locally thin if, for every k-tuple of its members, the ground set has at least one element contained in exactly one of them. For k = 5 we derive a new exponential upper bound for the maximum size of these families. This implies the same bound for all odd values of k > 3. Our proof uses the graph entropy bounding technique to exploit a self-similarity in the structure of the hypergraph associated with such set families.

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Fachini, Emanuela, János Körner, and Angelo Monti. "A Better Bound for Locally Thin Set Families." Journal of Combinatorial Theory, Series A 95, no. 2 (August 2001): 209–18. http://dx.doi.org/10.1006/jcta.2000.3162.

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Dagani, R. "New milestones set with Bulk, thin-film superconductors." Chemical & Engineering News 67, no. 46 (November 13, 1989): 22–23. http://dx.doi.org/10.1145/71580.71581.

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Dissertations / Theses on the topic "Thin set"

Lucardesi, Ilaria. "Compliance optimization for thin elastic structures." Phd thesis, Toulon, 2013. http://tel.archives-ouvertes.fr/tel-00845182.

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The main topic of the Thesis is the optimization of the compliance of thin elastic structures.The problem consists in finding the most robust configurations, when an infinitesimal amount of elastic material is subjected to a fixed force, and contained within a region having infinitesimal volume.The resistance to a load can be measured by computing a shape functional, the compliance, in which the shape represents the volume occupied by the elastic material. Thus we are led to study a minimization problem of a shape functional, under suitable constraints.In particular, we treat the case in which the design region is a thin rod, represented by a cylinder with infinitesimal cross section. The study finds its motivation in engineering problems: thin structures are very convenient to be used in practical applications.The approach we adopt draws inspiration from some recent works by I. Fragalà, G. Bouchitté and P. Seppecher, in which the authors deal with the case of thin elastic plates [G. Bouchitté, I. Fragalà, P. Seppecher: Structural optimization of thin plates: the three dimensional approach., Arch. Rat. Mech. Anal. (2011)]. We point out that these two problems are not merely technical variants one of the other, due to the substantial difference between the limit passages 3d-1d and 3d-2d, namely from 3 to 1 and from 3 to 2 dimensions.The study of optimal configurations led us to face another interesting variational problem: actually to establish whether homogenization phenomena occur in bars in pure torsion regime turns out to be equivalent to solve a nonstandard free boundary problem in the plane. This new problem is very challenging and, besides the link with torsion rods, it has mathematical interest in itself. One of the tools which can be employed to attack the problem is shape derivative for minima of integral functionals. The theory of shape derivatives is a widely studied topic (see e.g. the monograph by A. Henrot and M.Pierre Variations et Optimisation de Formes. Une Analyse Géométrique, Springer Berlin (2005), and the references therein), but the approach we propose in new and relies on assumptions which are weaker that the classical ones.

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Millán, Daniel. "Point-set manifold processing for computational mechanics: thin shells, reduced order modeling, cell motility and molecular conformations." Doctoral thesis, Universitat Politècnica de Catalunya, 2012. http://hdl.handle.net/10803/113375.

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In many applications, one would like to perform calculations on smooth manifolds of dimension d embedded in a high-dimensional space of dimension D. Often, a continuous description of such manifold is not known, and instead it is sampled by a set of scattered points in high dimensions. This poses a serious challenge. In this thesis, we approximate the point-set manifold as an overlapping set of smooth parametric descriptions, whose geometric structure is revealed by statistical learning methods, and then parametrized by meshfree methods. This approach avoids any global parameterization, and hence is applicable to manifolds of any genus and complex geometry. It combines four ingredients: (1) partitioning of the point set into subregions of trivial topology, (2) the automatic detection of the local geometric structure of the manifold by nonlinear dimensionality reduction techniques, (3) the local parameterization of the manifold using smooth meshfree (here local maximum-entropy) approximants, and (4) patching together the local representations by means of a partition of unity. In this thesis we show the generality, flexibility, and accuracy of the method in four different problems. First, we exercise it in the context of Kirchhoff-Love thin shells, (d=2, D=3). We test our methodology against classical linear and non linear benchmarks in thin-shell analysis, and highlight its ability to handle point-set surfaces of complex topology and geometry. We then tackle problems of much higher dimensionality. We perform reduced order modeling in the context of finite deformation elastodynamics, considering a nonlinear reduced configuration space, in contrast with classical linear approaches based on Principal Component Analysis (d=2, D=10000's). We further quantitatively unveil the geometric structure of the motility strategy of a family of micro-organisms called Euglenids from experimental videos (d=1, D~30000's). Finally, in the context of enhanced sampling in molecular dynamics, we automatically construct collective variables for the molecular conformational dynamics (d=1...6, D~30,1000's).

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Stöcker, Christina. "Level set methods for higher order evolution laws." Doctoral thesis, Saechsische Landesbibliothek- Staats- und Universitaetsbibliothek Dresden, 2008. http://nbn-resolving.de/urn:nbn:de:bsz:14-ds-1205350171405-81971.

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A numerical treatment of non-linear higher-order geometric evolution equations with the level set and the finite element method is presented. The isotropic, weak anisotropic and strong anisotropic situation is discussed. Most of the equations considered in this work arise from the field of thin film growth. A short introduction to the subject is given. Four different models are discussed: mean curvature flow, surface diffusion, a kinetic model, which combines the effects of mean curvature flow and surface diffusion and includes a further kinetic component, and an adatom model, which incorporates in addition free adatoms. As an introduction to the numerical schemes, first the isotropic and weak anisotropic situation is considered. Then strong anisotropies (non-convex anisotropies) are used to simulate the phenomena of faceting and coarsening. The experimentally observed effect of corner and edge roundings is reached in the simulation through the regularization of the strong anisotropy with a higher-order curvature term. The curvature regularization leads to an increase by two in the order of the equations, which results in highly non-linear equations of up to 6th order. For the numerical solution, the equations are transformed into systems of second order equations, which are solved with a Schur complement approach. The adatom model constitutes a diffusion equation on a moving surface. An operator splitting approach is used for the numerical solution. In difference to other works, which restrict to the isotropic situation, also the anisotropic situation is discussed and solved numerically. Furthermore, a treatment of geometric evolution equations on implicitly given curved surfaces with the level set method is given. In particular, the numerical solution of surface diffusion on curved surfaces is presented. The equations are discretized in space by standard linear finite elements. For the time discretization a semi-implicit discretization scheme is employed. The derivation of the numerical schemes is presented in detail, and numerous computational results are given for the 2D and 3D situation. To keep computational costs low, the finite element grid is adaptively refined near the moving curves and surfaces resp. A redistancing algorithm based on a local Hopf-Lax formula is used. The algorithm has been extended by the authors to the 3D case. A detailed description of the algorithm in 3D is presented in this work
In der Arbeit geht es um die numerische Behandlung nicht-linearer geometrischer Evolutionsgleichungen höherer Ordnung mit Levelset- und Finite-Elemente-Verfahren. Der isotrope, schwach anisotrope und stark anisotrope Fall wird diskutiert. Die meisten in dieser Arbeit betrachteten Gleichungen entstammen dem Gebiet des Dünnschicht-Wachstums. Eine kurze Einführung in dieses Gebiet wird gegeben. Es werden vier verschiedene Modelle diskutiert: mittlerer Krümmungsfluss, Oberflächendiffusion, ein kinetisches Modell, welches die Effekte des mittleren Krümmungsflusses und der Oberflächendiffusion kombiniert und zusätzlich eine kinetische Komponente beinhaltet, und ein Adatom-Modell, welches außerdem freie Adatome berücksichtigt. Als Einführung in die numerischen Schemata, wird zuerst der isotrope und schwach anisotrope Fall betrachtet. Anschließend werden starke Anisotropien (nicht-konvexe Anisotropien) benutzt, um Facettierungs- und Vergröberungsphänomene zu simulieren. Der in Experimenten beobachtete Effekt der Ecken- und Kanten-Abrundung wird in der Simulation durch die Regularisierung der starken Anisotropie durch einen Krümmungsterm höherer Ordnung erreicht. Die Krümmungsregularisierung führt zu einer Erhöhung der Ordnung der Gleichung um zwei, was hochgradig nicht-lineare Gleichungen von bis zu sechster Ordnung ergibt. Für die numerische Lösung werden die Gleichungen auf Systeme zweiter Ordnungsgleichungen transformiert, welche mit einem Schurkomplement-Ansatz gelöst werden. Das Adatom-Modell bildet eine Diffusionsgleichung auf einer bewegten Fläche. Zur numerischen Lösung wird ein Operatorsplitting-Ansatz verwendet. Im Unterschied zu anderen Arbeiten, die sich auf den isotropen Fall beschränken, wird auch der anisotrope Fall diskutiert und numerisch gelöst. Außerdem werden geometrische Evolutionsgleichungen auf implizit gegebenen gekrümmten Flächen mit Levelset-Verfahren behandelt. Insbesondere wird die numerische Lösung von Oberflächendiffusion auf gekrümmten Flächen dargestellt. Die Gleichungen werden im Ort mit linearen Standard-Finiten-Elementen diskretisiert. Als Zeitdiskretisierung wird ein semi-implizites Diskretisierungsschema verwendet. Die Herleitung der numerischen Schemata wird detailliert dargestellt, und zahlreiche numerische Ergebnisse für den 2D und 3D Fall sind gegeben. Um den Rechenaufwand gering zu halten, wird das Finite-Elemente-Gitter adaptiv an den bewegten Kurven bzw. den bewegten Flächen verfeinert. Es wird ein Redistancing-Algorithmus basierend auf einer lokalen Hopf-Lax Formel benutzt. Der Algorithmus wurde von den Autoren auf den 3D Fall erweitert. In dieser Arbeit wird der Algorithmus für den 3D Fall detailliert beschrieben

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Stöcker, Christina. "Level set methods for higher order evolution laws." Doctoral thesis, Forschungszentrum caesar, 2007. https://tud.qucosa.de/id/qucosa%3A24054.

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A numerical treatment of non-linear higher-order geometric evolution equations with the level set and the finite element method is presented. The isotropic, weak anisotropic and strong anisotropic situation is discussed. Most of the equations considered in this work arise from the field of thin film growth. A short introduction to the subject is given. Four different models are discussed: mean curvature flow, surface diffusion, a kinetic model, which combines the effects of mean curvature flow and surface diffusion and includes a further kinetic component, and an adatom model, which incorporates in addition free adatoms. As an introduction to the numerical schemes, first the isotropic and weak anisotropic situation is considered. Then strong anisotropies (non-convex anisotropies) are used to simulate the phenomena of faceting and coarsening. The experimentally observed effect of corner and edge roundings is reached in the simulation through the regularization of the strong anisotropy with a higher-order curvature term. The curvature regularization leads to an increase by two in the order of the equations, which results in highly non-linear equations of up to 6th order. For the numerical solution, the equations are transformed into systems of second order equations, which are solved with a Schur complement approach. The adatom model constitutes a diffusion equation on a moving surface. An operator splitting approach is used for the numerical solution. In difference to other works, which restrict to the isotropic situation, also the anisotropic situation is discussed and solved numerically. Furthermore, a treatment of geometric evolution equations on implicitly given curved surfaces with the level set method is given. In particular, the numerical solution of surface diffusion on curved surfaces is presented. The equations are discretized in space by standard linear finite elements. For the time discretization a semi-implicit discretization scheme is employed. The derivation of the numerical schemes is presented in detail, and numerous computational results are given for the 2D and 3D situation. To keep computational costs low, the finite element grid is adaptively refined near the moving curves and surfaces resp. A redistancing algorithm based on a local Hopf-Lax formula is used. The algorithm has been extended by the authors to the 3D case. A detailed description of the algorithm in 3D is presented in this work.
In der Arbeit geht es um die numerische Behandlung nicht-linearer geometrischer Evolutionsgleichungen höherer Ordnung mit Levelset- und Finite-Elemente-Verfahren. Der isotrope, schwach anisotrope und stark anisotrope Fall wird diskutiert. Die meisten in dieser Arbeit betrachteten Gleichungen entstammen dem Gebiet des Dünnschicht-Wachstums. Eine kurze Einführung in dieses Gebiet wird gegeben. Es werden vier verschiedene Modelle diskutiert: mittlerer Krümmungsfluss, Oberflächendiffusion, ein kinetisches Modell, welches die Effekte des mittleren Krümmungsflusses und der Oberflächendiffusion kombiniert und zusätzlich eine kinetische Komponente beinhaltet, und ein Adatom-Modell, welches außerdem freie Adatome berücksichtigt. Als Einführung in die numerischen Schemata, wird zuerst der isotrope und schwach anisotrope Fall betrachtet. Anschließend werden starke Anisotropien (nicht-konvexe Anisotropien) benutzt, um Facettierungs- und Vergröberungsphänomene zu simulieren. Der in Experimenten beobachtete Effekt der Ecken- und Kanten-Abrundung wird in der Simulation durch die Regularisierung der starken Anisotropie durch einen Krümmungsterm höherer Ordnung erreicht. Die Krümmungsregularisierung führt zu einer Erhöhung der Ordnung der Gleichung um zwei, was hochgradig nicht-lineare Gleichungen von bis zu sechster Ordnung ergibt. Für die numerische Lösung werden die Gleichungen auf Systeme zweiter Ordnungsgleichungen transformiert, welche mit einem Schurkomplement-Ansatz gelöst werden. Das Adatom-Modell bildet eine Diffusionsgleichung auf einer bewegten Fläche. Zur numerischen Lösung wird ein Operatorsplitting-Ansatz verwendet. Im Unterschied zu anderen Arbeiten, die sich auf den isotropen Fall beschränken, wird auch der anisotrope Fall diskutiert und numerisch gelöst. Außerdem werden geometrische Evolutionsgleichungen auf implizit gegebenen gekrümmten Flächen mit Levelset-Verfahren behandelt. Insbesondere wird die numerische Lösung von Oberflächendiffusion auf gekrümmten Flächen dargestellt. Die Gleichungen werden im Ort mit linearen Standard-Finiten-Elementen diskretisiert. Als Zeitdiskretisierung wird ein semi-implizites Diskretisierungsschema verwendet. Die Herleitung der numerischen Schemata wird detailliert dargestellt, und zahlreiche numerische Ergebnisse für den 2D und 3D Fall sind gegeben. Um den Rechenaufwand gering zu halten, wird das Finite-Elemente-Gitter adaptiv an den bewegten Kurven bzw. den bewegten Flächen verfeinert. Es wird ein Redistancing-Algorithmus basierend auf einer lokalen Hopf-Lax Formel benutzt. Der Algorithmus wurde von den Autoren auf den 3D Fall erweitert. In dieser Arbeit wird der Algorithmus für den 3D Fall detailliert beschrieben.

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Murray, Eric B. "Dry Stacked Surface Bonded Masonry - Structural Testing and Evaluation." Diss., CLICK HERE for online access, 2007. http://contentdm.lib.byu.edu/ETD/image/etd2188.pdf.

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Yan, Zheng. "The Econometrics of Piecewise Linear Budget Constraints With Skewed Error Distributons: An Application To Housing Demand In The Presence Of Capital Gains Taxation." Diss., Virginia Tech, 1999. http://hdl.handle.net/10919/28606.

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This paper examines the extent to which thin markets in conjunction with tax induced kinks in the budget constraint cause consumer demand to be skewed. To illustrate the principles I focus on the demand for owner-occupied housing. Housing units are indivisible and heterogeneous while tastes for housing are at least partly idiosyncratic, causing housing markets to be thin. In addition, prior to 1998, capital gains tax provisions introduced a sharp kink in the budget constraint of existing owner-occupiers in search of a new home: previous homeowners under age 55 paid no capital gains tax if they bought up, but were subject to capital gains tax if they bought down. I first characterize the economic conditions under which households err on the up or down side when choosing a home in the presence of a thin market and a kinked budget constraint. I then specify an empirical model that takes such effects into account. Results based on Monte Carlo experiments indicate that failing to allow for skewness in the demand for housing leads to biased estimates of the elasticities of demand when such skewness is actually present. In addition, estimates based on American Housing Survey data suggest that such bias is substantial: controlling for skewness reduces the price elasticity of demand among previous owner-occupiers from 1.6 to 0.3. Moreover, 58% of previous homeowners err on the up while only 42% err on the down side. Thus, housing demand is skewed.
Ph. D.

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Guzzone, Ian Paul. "THIS IS URINETOWN!" Master's thesis, Temple University Libraries, 2012. http://cdm16002.contentdm.oclc.org/cdm/ref/collection/p245801coll10/id/199192.

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Theater
M.F.A.
Urinetown: The Musical is a meta-theatrical musical that addresses issues such as sustainability, corruption, and human intentions. For my design of Urinetown: The Musical, I sought to poetically represent the world of the play without interfering with the story telling. From start to end, this is my process.
Temple University--Theses

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Dhawan, Sandeep Sonny. "Learning to focus and focusing to learn : more than a cortical trick." Thesis, University of St Andrews, 2018. http://hdl.handle.net/10023/15883.

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The consequence of many psychiatric and neurodegenerative disorders, such as Parkinson's disease and schizophrenia, is an impairment in ‘executive functioning'; an umbrella term for several cognitive processes, including the focussing and shifting of attention and the inhibition of responding. The ability to form an ‘attentional set' involves learning to discriminate qualities of a multidimensional cue, and to subsequently learn which quality is relevant, and therefore predictive of reward. According to recent research, the subthalamic nucleus (STN) and possibly the adjacent zona incerta (ZI) may mediate the formation of attentional set. Dysregulation of the STN as a result of Parkinson's disease contributes to characteristic motor symptoms, and whilst deep-brain stimulation of this region may treat gross motor impairments, it may also impair cognition. The work in this thesis aimed to expand our understanding of the mechanisms of attentional set-formation, and the role of the STN in this process. This thesis evaluates new methods for examining set-formation in the attentional set-shifting task; rather than inferring this behaviour solely from the cost of shifting set, modifications to the task design in Chapters 3 & 4 explored several hypotheses designed to exploit a deficit in this behaviour. Chapter 6 revealed that inhibition of this region with designer receptors leads to a disruption in attentional selectivity, which compromises the ability to form an attentional set. This manifested as an inability to parse relevant information from irrelevant, and instead, animals learned the stimuli holistically. The findings in this thesis also suggested that reversal and attentional shifting processes do not operate independently, but rather in a hierarchy, and that consequently, the STN is a region that may be crucial in selecting appropriate responses during associative learning that leads to the formation of an attentional set.

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Schlenker, Thomas [Verfasser]. "Growth of Cu(In,Ga)Se2 thin films / Thomas Schlenker." Aachen : Shaker, 2005. http://d-nb.info/1186577509/34.

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Landry, Kenneth J. "The performance and compatibility of thin client computing with fleet operations." Thesis, Monterey, Calif. : Springfield, Va. : Naval Postgraduate School ; Available from National Technical Information Service, 2006. http://library.nps.navy.mil/uhtbin/hyperion/06Jun%5FLandry.pdf.

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Thesis (M.S. in Information Systems and Operations)--Naval Postgraduate School, June 2006.
Thesis Advisor(s): Douglas Brinkley. "June 2006." Includes bibliographical references (p. 85). Also available in print.

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Books on the topic "Thin set"

Styron, William. Set this house onfire. London: Black Swan, 1985.

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Styron, William. Set this house on fire. London: Pan Books, 1992.

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Ruff, Matt. Set This House in Order. New York: HarperCollins, 2007.

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Set this book on fire! 2nd ed. Mena, AR: Cedar Hill Publications, 2001.

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Styron, William. Set this house on fire. New York: Vintage Books, 1993.

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service), ScienceDirect (Online, ed. Cu(InGa)Se2 based thin film solar cells. London: Academic, 2009.

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Bartlett, W. B. Louder than the sea. Toronto, ON: Cormorant Books, 2001.

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Hoban, Russell. The sea-thing child. 2nd ed. Cambridge, Mass: Candlewick Press, 1999.

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Patrick, Benson, ed. The sea-thing child. London: Walker, 1999.

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Foton Fakutorī Kenkyūkai (2007 Kō-enerugī Kasokuki Kenkyū Kikō). Kōkido shinkū shigai, nan X-sen hōshakō o mochiita kinōsei yūki, seitai bunshi hakumaku kenkyū no shintenkai: PF Kenkyūkai. Tsukuba-shi: KEK, 2007.

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Book chapters on the topic "Thin set"

Weik, Martin H. "thin television set." In Computer Science and Communications Dictionary, 1779. Boston, MA: Springer US, 2000. http://dx.doi.org/10.1007/1-4020-0613-6_19534.

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Skrzypczak, Michał. "Recognition by Thin Algebras." In Descriptive Set Theoretic Methods in Automata Theory, 121–35. Berlin, Heidelberg: Springer Berlin Heidelberg, 2016. http://dx.doi.org/10.1007/978-3-662-52947-8_7.

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Skrzypczak, Michał. "Uniformization on Thin Trees." In Descriptive Set Theoretic Methods in Automata Theory, 137–56. Berlin, Heidelberg: Springer Berlin Heidelberg, 2016. http://dx.doi.org/10.1007/978-3-662-52947-8_8.

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Skrzypczak, Michał. "When a Thin Language Is Definable in wmso." In Descriptive Set Theoretic Methods in Automata Theory, 93–119. Berlin, Heidelberg: Springer Berlin Heidelberg, 2016. http://dx.doi.org/10.1007/978-3-662-52947-8_6.

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Caflisch, Russel, and Christian Ratsch. "Level Set Methods for Simulation of Thin Film Growth." In Handbook of Materials Modeling, 2337–50. Dordrecht: Springer Netherlands, 2005. http://dx.doi.org/10.1007/978-1-4020-3286-8_121.

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Park, Won-Kwang, and Dominique Lesselier. "Level Set Method for Reconstruction of Thin Electromagnetic Inclusions." In Springer Proceedings in Physics, 99–108. Berlin, Heidelberg: Springer Berlin Heidelberg, 2010. http://dx.doi.org/10.1007/978-3-642-13624-5_11.

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Exerowa, Dotchi, Roumen Todorov, and Dimo Platikanov. "Using thin Liquid Film for Study of Pulmonary Surfactants." In Encyclopedia of Biocolloid and Biointerface Science 2V Set, 905–14. Hoboken, NJ, USA: John Wiley & Sons, Inc., 2016. http://dx.doi.org/10.1002/9781119075691.ch73.

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Panasenko, Grigory P., and Ruxandra Stavre. "Well Posedness and Asymptotic Expansion of Solution of Stokes Equation Set in a Thin Cylindrical Elastic Tube." In Around the Research of Vladimir Maz'ya II, 275–301. New York, NY: Springer New York, 2009. http://dx.doi.org/10.1007/978-1-4419-1343-2_13.

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Fieres, J., J. Mattes, and R. Eils. "A Point Set Registration Algorithm Using a Motion Model Based on Thin-Plate Splines and Point Clustering." In Lecture Notes in Computer Science, 76–83. Berlin, Heidelberg: Springer Berlin Heidelberg, 2001. http://dx.doi.org/10.1007/3-540-45404-7_11.

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Conference papers on the topic "Thin set"

Hungria, Ricardo, Gabriel Arce, Marwa Hassan, Tyson Rupnow, Moinul Mahdi, and Mohammad Louay. "Interface Characterization of a Jointless Engineered Cementitious Composite Ultra-Thin Whitetopping (ECC-UTW)." In Tran-SET 2020. Reston, VA: American Society of Civil Engineers, 2021. http://dx.doi.org/10.1061/9780784483305.026.

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Greco, Silvia, and Luisa Molari. "New set up for tensile test performed in thin bamboo." In Fifth International Conference on Sustainable Construction Materials and Technologies. Coventry University and The University of Wisconsin Milwaukee Centre for By-products Utilization, 2019. http://dx.doi.org/10.18552/2019/idscmt5171.

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Vora, Poorvi L., H. Joel Trussell, and Lawrence S. Iwan. "Design results for a set of thin film color-scanning filters." In IS&T/SPIE's Symposium on Electronic Imaging: Science & Technology, edited by Eric Walowit. SPIE, 1995. http://dx.doi.org/10.1117/12.206554.

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Jansen, S. W., Philip J. Hatchett, S. W. Hughes, D. Paul Jones, and Desmond R. Gibson. ""Black art" of thin film coating: why this term is used and how to change this mind-set." In Optical Instrumentation & Systems Design. SPIE, 1996. http://dx.doi.org/10.1117/12.246806.

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Gryko, Lukasz, Andrzej Zajac, and Marian Gilewski. "Optoelectronic set for measuring the absorption spectrum of the thin biological media." In Photonics Applications in Astronomy, Communications, Industry, and High-Energy Physics Experiments 2013, edited by Ryszard S. Romaniuk. SPIE, 2013. http://dx.doi.org/10.1117/12.2035433.

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Cruz, Tiago, Paulo Simoes, Pedro Cabaco, Edmundo Monteiro, and Fernando Bastos. "On the use of thin-client Set-Top Boxes for IPTV services." In 38th Annual IEEE Conference on Local Computer Networks (LCN 2013). IEEE, 2013. http://dx.doi.org/10.1109/lcn.2013.6761331.

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Andriychuk, Mykhaylo. "Creating specific refraction coefficient of medium using a set of embedded thin wires." In 2015 13th International Conference The Experience of Designing and Application of CAD Systems in Microelectronics (CADSM). IEEE, 2015. http://dx.doi.org/10.1109/cadsm.2015.7230788.

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Andriychuk, Mykhaylo, Yarema Kuleshnyk, and Volodymyr Senyk. "EM Wave Scattering on Thin Flexible Films Supplemented by a Set of Micro Particles." In 2020 IEEE XVIth International Conference on the Perspective Technologies and Methods in MEMS Design (MEMSTECH). IEEE, 2020. http://dx.doi.org/10.1109/memstech49584.2020.9109498.

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Andriychuk, Mykhaylo I. "Creating a Peculiar Refraction Coefficient of Material Supplemented by a Set of Thin Wires." In 2020 23rd International Microwave and Radar Conference (MIKON). IEEE, 2020. http://dx.doi.org/10.23919/mikon48703.2020.9253966.

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Krasilnikova, A., A. Piegari, M. Dami, L. Abel-Tiberini, F. Lemarquis, and M. Lequime. "Spatially resolved spectroscopy for non-uniform thin film coatings: comparison of two dedicated set-ups." In Optical Systems Design 2005. SPIE, 2005. http://dx.doi.org/10.1117/12.625183.

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Reports on the topic "Thin set"

Yamaguchi, Hisato. You can’t see it, but it’s more than 200 times stronger than steel. Office of Scientific and Technical Information (OSTI), April 2019. http://dx.doi.org/10.2172/1511193.

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Hunke, Elizabeth Clare, and Andrew Frank Roberts. Sea ice—it’s more than just frozen water. Office of Scientific and Technical Information (OSTI), December 2018. http://dx.doi.org/10.2172/1485366.

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McManus, Margaret A., Mark T. Stacey, and John P. Ryan. Quantification of the Interacting Physical, Biological, Optical and Chemical Properties of Thin Layers in the Sea. Fort Belvoir, VA: Defense Technical Information Center, January 2009. http://dx.doi.org/10.21236/ada531014.

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McManus, Margaret A., Mark T. Stacey, and John P. Ryan. Quantification of the Interacting Physical, Biological, Optical and Chemical Properties of Thin Layers in the Sea. Fort Belvoir, VA: Defense Technical Information Center, September 2007. http://dx.doi.org/10.21236/ada574183.

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Dickerson, B. D., X. Zhang, and S. B. Desu. Section 1: Interfacial reactions and grain growth in ferroelectric SrBi{sub 2}Ta{sub 2}O (SBT) thin films on Si substrates. Office of Scientific and Technical Information (OSTI), April 1997. http://dx.doi.org/10.2172/494124.

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Foscolos, A. E. Mass Transfer of Elements in Middle Triassic Shale / Sandstone Sequences, Sverdrup Basin, Arctic Islands, Part 2: Mineralogy, Clay Mineralogy, Thermogravimetric Analysis and Chemistry of the Greater Than .2 Micron Fraction and Sem Studies On Thin Sections, East Drake L-06 and Sky Battle Bay M-11 Cores. Natural Resources Canada/ESS/Scientific and Technical Publishing Services, 1989. http://dx.doi.org/10.4095/130812.

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Edwards, Lulu, Haley Bell, and Marcus Opperman. Alternatives for large crater repairs using Rapid Set Concrete Mix®. Engineer Research and Development Center (U.S.), June 2021. http://dx.doi.org/10.21079/11681/40969.

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Research was conducted at the U.S. Army Engineer Research and Development Center (ERDC) in Vicksburg, MS, to identify alternative repair methods and materials for large crater repairs using Rapid Set Concrete Mix®. This report presents the technical evaluation of the field performance of full-depth slab replacement methods conducted using Rapid Set Concrete Mix® over varying strength foundations. The performance of each large crater repair was determined by using a load cart representing one-half of the full gear of a C-17 aircraft. Results indicate that using rapid-setting concrete is a viable material for large crater repairs, and the performance is dependent on surface thickness and base strength.

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Weeks, Julie, James Dahlhamer, Jennifer Madans, and Aaron Maitland. Measuring Disability: An Examination of Differences Between the Washington Group Short Set on Functioning and the American Community Survey Disability Questions. National Center for Health Statistics (U.S.), August 2021. http://dx.doi.org/10.15620/cdc:107202.

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This report examines differences in survey reports of disability between two sets of disability questions, the Short Set on Functioning (WG-SS) developed by the Washington Group on Disability Statistics (WG) and a set of disability questions developed for the American Community Survey (ACS).

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Hossain, Niamat Ullah Ibne, Raed Jaradat, Michael Hamilton, Charles Keating, and Simon Goerger. A historical perspective on development of systems engineering discipline : a review and analysis. Engineer Research and Development Center (U.S.), April 2021. http://dx.doi.org/10.21079/11681/40259.

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Since its inception, Systems Engineering (SE) has developed as a distinctive discipline, and there has been significant progress in this field in the past two decades. Compared to other engineering disciplines, SE is not affirmed by a set of underlying fundamental propositions, instead it has emerged as a set of best practices to deal with intricacies stemming from the stochastic nature of engineering complex systems and addressing their problems. Since the existing methodologies and paradigms (dominant pat- terns of thought and concepts) of SE are very diverse and somewhat fragmented. This appears to create some confusion regarding the design, deployment, operation, and application of SE. The purpose of this paper is 1) to delineate the development of SE from 1926-2017 based on insights derived from a histogram analysis, 2) to discuss the different paradigms and school of thoughts related to SE, 3) to derive a set of fundamental attributes of SE using advanced coding techniques and analysis, and 4) to present a newly developed instrument that could assess the performance of systems engineers. More than Two hundred and fifty different sources have been reviewed in this research in order to demonstrate the development trajectory of the SE discipline based on the frequency of publication.

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Benages, Eva, and Matilde Mas. Knowledge-Based Capital in a Set of Latin American Countries: The LA KLEMS-IADB Project. Inter-American Development Bank, April 2021. http://dx.doi.org/10.18235/0003202.

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This paper presents the framework and methodology for the economic valuation of the knowledge-based economy in five Latin American (LA) countries, namely Costa Rica, El Salvador, Mexico, Peru and the Dominican Republic, for which a new database (IDB-Ivie, 2020) has recently been released. It uses an alternative approach to measuring the knowledge intensity of economies as to those based on the aggregation of industries according to selected indicators such as research and development (R&D) expenditure or labor force skills. Instead, we follow an economic approach rooted in the growth accounting methodology, determining the contribution of each individual factor of production (capital and labor) according to the prices of the services it provides. This methodology will be applied to the above-mentioned LA countries, and to the United States and Spain, which are used as benchmarks. Data are available for the period 1995-2016.

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