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81	A population approach to systems of Izhikevich neurons: can neuron interaction cause bursting? Xie, Rongzheng 29 April 2020 (has links) In 2007, Modolo and colleagues derived a population density equation for a population of Izhekevich neurons. This population density equation can describe oscillations in the brain that occur in Parkinson’s disease. Numerical simulations of the population density equation showed bursting behaviour even though the individual neurons had parameters that put them in the tonic firing regime. The bursting comes from neuron interactions but the mechanism producing this behaviour was not clear. In this thesis we study numerical behaviour of the population density equation and then use a combination of analysis and numerical simulation to analyze the basic qualitative behaviour of the population model by means of a simplifying assumption: that the initial density is a Dirac function and all neurons are identical, including the number of inputs they receive, so they remain as a point mass over time. This leads to a new ODE model for the population. For the new ODE system, we define a Poincaré map and then to describe and analyze it under conditions on model parameters that are met by the typical values adopted by Modolo and colleagues. We show that there is a unique fixed point for this map and that under changes in a bifurcation parameter, the system transitions from fast tonic firing, through an interval where bursting occurs, the number of spikes decreasing as the bifurcation parameter increases, and finally to slow tonic firing. / Graduate Izhikevich neurons Population density equation Neuron interaction Bursting Poincaré map Fixed point Bifurcation
82	Developing fixed-point photography methodologies for assessing post-fire mountain fynbos vegetation succession as a tool for biodiversity management Alkalei, Osama January 2020 (has links) Magister Scientiae (Biodiversity and Conservation Biology) - MSc (Biodiv and Cons Biol) / Areas of high biodiversity and complex species assemblages are often difficult to manage and to set up meaningful monitoring and evaluations programmes. Mountain Fynbos is such an ecosystem and in the Cape of Good Hope (part of the Table Mountain National Park) plant biodiversity over the last five decades has been in decline. The reasons are difficult to speculate since large herbivores, altered fire regimes and even climate change could be contributors to this decline which has been quantified using fixed quadrats and standard cover-abundance estimates based on a Braun-Blanquet methodology. To provide more detailed data that has more resolution in terms of identifying ecological processes, Fixed-Point Repeat Photography has been presented as a management “solution”. However, photography remains a difficult method to standardize subjects and has certain operational limitations. Biodiversity management Change detection Fixed-point repeat photography High-resolution images Mountain Fynbos Post-fire succession
83	Věty o pevném bodě v teorii diferenciálních rovnic / Fixed point theorems in the theory of differential equations Zelina, Michael January 2020 (has links) This thesis is devoted to show various applications of fixed point theorems on dif- ferential equations. In the beginning we use a notion of topological degree to derive several fixed points theorems, primarily Brouwer, Schauder and Kakutani-Ky Fan the- orem. Then we apply them on a wide range of relatively simple problems from ordinary and partial differential equations (ode and pde). Finally, we take a look on a few more complex problems. First is an existence of a solution to the model of mechanical os- cillator with non-monotone dependence of both displacement and velocity. Second is a solution to so called Gause predator-prey model with a refuge. The last one is cer- tain partial differential equation with a constraint which determines maximal monotone graph. 1
84	The Moduli Space of Polynomial Maps and Their Fixed-Point Multipliers / 多項式写像のモジュライ空間とその固定点における微分係数 Sugiyama, Toshi 23 July 2018 (has links) 京都大学 / 0048 / 新制・論文博士 / 博士(理学) / 乙第13201号 / 論理博第1560号 / 新制\|\|理\|\|1635(附属図書館) / 京都大学大学院理学研究科数学・数理解析専攻 / (主査)教授宍倉光広, 教授泉正己, 教授國府寛司 / 学位規則第4条第2項該当 / Doctor of Science / Kyoto University / DFAM complex dynamics moduli space polynomial map fixed-point multiplier Bezout's theorem intersection multiplicity branched covering 400
85	Implementation of Low-Bit Rate Audio Codec, Codec2, in Verilog on Modern FPGAS Sampath Kumar, Santhiya 30 April 2020 (has links) No description available. Computer Engineering Electrical Engineering
86	A Self-Contained Review of Thompson's Fixed-Point-Free Automorphism Theorem Sracic, Mario F. 19 June 2014 (has links) No description available. Mathematics Theoretical Mathematics Finite Group Theory modern algebra automorphisms fixed point free
87	An FPGA Implementation of Large-Scale Image Orthorectification Shaffer, Daniel Alan 29 May 2018 (has links) No description available. Electrical Engineering Orthorectification Field Programmable Gate Array FPGA Back-Projection Size Weight and Power SWaP Fixed-point
88	Fixed-Point Image Orthorectification Algorithms for Reduced Computational Cost French, Joseph Clinton 17 May 2016 (has links) No description available. Electrical Engineering Engineering
89	Pseudo-Anosov maps and genus-two L-space knots: Reinoso, Braeden January 2024 (has links) Thesis advisor: John A. Baldwin / We classify genus-two L-space knots in S3 and the Poincare homology sphere.This leads to the first and to-date only detection results in knot Floer homology for knots of genus greater than one. Our proofs interweave Floer-homological properties of L-space knots, the geometry of pseudo-Anosov maps, and the theory of train tracks and folding automata for braids. The crux of our argument is a complete classification of fixed-point-free pseudo-Anosov maps in all but one stratum on the genus-two surface with one boundary component. To facilitate our classification, we exhibit a small family of train tracks carrying all pseudo-Anosov maps in most strata on the marked disk. As a consequence of our proof technique, we almost completely classify genus-two, hyperbolic, fibered knots with knot Floer homology of rank 1 in their next-to-top grading in any 3-manifold. Several corollaries follow, regarding the Floer homology of cyclic branched covers, SU(2)-abelian Dehn surgeries, Khovanov and annular Khovanov homology, and instanton Floer homology. / Thesis (PhD) — Boston College, 2024. / Submitted to: Boston College. Graduate School of Arts and Sciences. / Discipline: Mathematics. fixed point Floer homology knot theory L-space knot pseudo-Anosov train track
90	The Computational Kleinman-Newton Method in Solving Nonlinear Nonquadratic Control Problems Kang, Jinghong 28 April 1998 (has links) This thesis deals with non-linear non-quadratic optimal control problems in an autonomous system and a related iterative numerical method, the Kleinman-Newton method, for solving the problem. The thesis proves the local convergence of Kleinman-Newton method using the contraction mapping theorem and then describes how this Kleinman-Newton method may be used to numerically solve for the optimal control and the corresponding solution. In order to show the proof and the related numerical work, it is necessary to review some of earlier work in the beginning of Chapter 1 [Zhang], and to introduce the Kleinman-Newton method at the end of the chapter. In Chapter 2 we will demonstrate the proof. In Chapter 3 we will show the related numerical work and results. / Ph. D. Nonlinear Nonquadratic Control Hamiltonian Function Adjoint Equation Fixed Point Theorem Contraction Interpolation

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