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121	Fixed points, fractals, iterated function systems and generalized support vector machines Qi, Xiaomin January 2016 (has links) In this thesis, fixed point theory is used to construct a fractal type sets and to solve data classification problem. Fixed point method, which is a beautiful mixture of analysis, topology, and geometry has been revealed as a very powerful and important tool in the study of nonlinear phenomena. The existence of fixed points is therefore of paramount importance in several areas of mathematics and other sciences. In particular, fixed points techniques have been applied in such diverse fields as biology, chemistry, economics, engineering, game theory and physics. In Chapter 2 of this thesis it is demonstrated how to define and construct a fractal type sets with the help of iterations of a finite family of generalized F-contraction mappings, a class of mappings more general than contraction mappings, defined in the context of b-metric space. This leads to a variety of results for iterated function system satisfying a different set of contractive conditions. The results unify, generalize and extend various results in the existing literature. In Chapter 3, the theory of support vector machine for linear and nonlinear classification of data and the notion of generalized support vector machine is considered. In the thesis it is also shown that the problem of generalized support vector machine can be considered in the framework of generalized variation inequalities and results on the existence of solutions are established. / FUSION support vector machine fixed points iterated function system variational inequality
122	Catégorie assujettie à une fonctionnelle et une application aux systèmes Hamiltoniens Beauchemin, Nicolas January 2006 (has links) Thèse numérisée par la Direction des bibliothèques de l'Université de Montréal. Catégorie de Lusternik-Schnirelman Catégorie relative Points critiques Systèmes Hamiltoniens
123	Quelques résultats d'existence de points asymptotiquement critiques Perreault, Jean-François January 2004 (has links) Mémoire numérisé par la Direction des bibliothèques de l'Université de Montréal. Points asymptotiquement critiques Conditions de compacité Enlacement Résultats de minimax
124	Quelques propriétés du complexe de Morse-Novikov Rousseau, Olivier January 2004 (has links) Mémoire numérisé par la Direction des bibliothèques de l'Université de Montréal. Points critiques Théorie de Morse Complexe de Morse-Novikov Indice de Conley Dualité
125	Model-based recursive partitioning Zeileis, Achim, Hothorn, Torsten, Hornik, Kurt January 2005 (has links) (PDF) Recursive partitioning is embedded into the general and well-established class of parametric models that can be fitted using M-type estimators (including maximum likelihood). An algorithm for model-based recursive partitioning is suggested for which the basic steps are: (1) fit a parametric model to a data set, (2) test for parameter instability over a set of partitioning variables, (3) if there is some overall parameter instability, split the model with respect to the variable associated with the highest instability, (4) repeat the procedure in each of the daughter nodes. The algorithm yields a partitioned (or segmented) parametric model that can effectively be visualized and that subject-matter scientists are used to analyze and interpret. / Series: Research Report Series / Department of Statistics and Mathematics
126	Backward iteration in the unit ball. Ostapyuk, Olena January 1900 (has links) Doctor of Philosophy / Department of Mathematics / Pietro Poggi-Corradini / We consider iteration of an analytic self-map f of the unit ball in the N-dimensional complex space C[superscript]N. Many facts were established about such maps and their dynamics in the 1-dimensional case (i.e. for self-maps of the unit disk), and we generalize some of them in higher dimensions. In one dimension, the classical Denjoy-Wolff theorem states the convergence of forward iterates to a unique attracting fixed point, while backward iterates have much more complicated nature. However, under additional conditions (when the hyperbolic distance between two consecutive points stays bounded), backward iteration sequence converges to a point on the boundary of the unit disk, which happens to be a fixed point with multiplier greater than or equal to 1. In this paper, we explore backward-iteration sequences in higher dimension. Our main result shows that in the case when f is hyperbolic or elliptic, such sequences with bounded hyperbolic step converge to a point on the boundary, other than the Denjoy-Wolff (attracting) point. These points are called boundary repelling fixed points (BRFPs) and possess several nice properties. In particular, in the case when such points are isolated from other BRFPs, they are completely characterized as limits of backward iteration sequences. Similarly to classical results, it is also possible to construct a (semi) conjugation to an automorphism of the unit ball. However, unlike in the 1-dimensional case, not all BRFPs are isolated, and we present several counterexamples to show that. We conclude with some results in the parabolic case. Complex analysis Iteration Boundary fixed points Mathematics (0405)
127	The optimization of a grinding circuit Campbell, Quentin Peter January 1995 (has links) A dissertation submitted to the Faculty of Engineenug, University of the Witwatersrand, in fulfilment. of the requirements for the degree of Master of Science in Engineering, / A multi variable control strategy for a grinding circuit at East Driefontein has been implemented by others and has enabled it to operate under stable conditions. The next development needed was to find conditions under which tne efficiency of the circuit was the greatest. Optimum set points exist for the multi variable controller to keep the circuit at its most efficient state. This project was done to determine these set points, and how it affected the operation of the circuit. The strategy involved the collection of process data, the development of mathematical models and the determination of these optimum set points by simulation, This option reduced interference with routine production operations, which is often a prohibiting factor during any development work on an existing process. The optimum set points were successfully determined, and were compared with previous findings and current plant practice. / AC2017 Grinding circuit Optimum set points Collection of process data Mathematical models
128	Pre and post natal facial development in South Africans of African descent Adebesin, Abduljalil Adetola 04 March 2013 (has links) No description available. anthropometric points facial development fluctuating asymmetry prenatal postnatal Maxillofacial Development
129	"Sobre a existência de pontos periódicos para homeomorfismos do anel fechado" / "On the existence of periodic points for homeomorphisms of the closed annulus" Vargas, Walter Teofilo Huaraca 20 July 2006 (has links) O conhecido Teorema de Poincaré afirma: O número de rotação de homeomorfismo do círculo S^1 que preserva orientação é racional se, e somente se, o homeomorfismo possui um ponto periódico cujo período é igual ao denominador de tal racional. Na presente dissertação estudamos resultados análogos, ao resultado acima mencionado, para homeomorfismos do anel A=S^1 x I homotópicos à identidade. Mais precisamente, estudaremos o famoso Teorema de Poincaré - Birkhoff e algumas versões devidas a J. Franks. Isto será feito impondo algumas condições no conjunto de rotação, o qual é uma generalização do número de rotação para homeomorfismos do círculo. / The well known Poincaré's Theorem state: The rotation number of an orientation preserving circle homeomorphism is rational if, only if, the homeomorphism has a periodic point of period equal to denominator of the rational. In this monograph we study results analogous, to the result above mentioned, for homeomorphisms of A=S^1 x I homotophics to the identity. More precisely, we study the famous Poincaré - Birkhoff Theorem and some versions obtained by J. Franks. This it will be done imposing some conditions in the rotation set, which is generalization of the rotation number for circle homeomorphisms. anel annulus fixed points homeomorfismos homeomorphisms pontos fixos
130	Abstract convexity: fixed points and applications Llinares Císcar, Juan Vicente 12 December 1994 (has links) No description available. Abstract convexity Fixed points Fundamentos del Análisis Económico

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