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The Global ETD Search service is a free service for researchers
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Networked Digital Library of Theses and Dissertations.
Our metadata is collected from universities around the world. If you manage a university/consortium/country archive and want to be added, details can be found on the NDLTD website.
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Showing 31 to 40 of 43 (0.132 seconds)Spelling suggestions: "subject:"fcritical 4points"" "subject:"fcritical 5points""
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Analýza kritických míst v silniční dopravě ve vybraném regionu - Českobudějovicko / Analysis of Critical Places in Road Transport in the České Budějovice DistrictPerničková, Barbora January 2014 (has links)
This master thesis focuses on the analysis of critical points on the road in České Budějovice region. The aim is to suggest organizational and engineering solutions that have an impact on traffic safety in selected sections of road .
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[en] DEEP MORIN SINGULARITIES OF THE MCKEAN-SCOVEL OPERATOR / [pt] SINGULARIDADES DE MORIN PROFUNDAS DO OPERADOR MCKEAN-SCOVELLUIS ANTONIO GOMEZ ARDILA 04 November 2021 (has links)
[pt] O operador de McKean-Scovel agindo sobre funções que satisfazem condições
de Dirichlet é o operador não-linear de Sturm-Liouville mais simples:
a não-linearidade é elevar ao quadrado. Nesse texto, demonstra-se uma conjetura
que de mais de trinta anos: seu conjunto crítico só contém singularidades
de Morin, que podem ter profundidade arbitrária. / [en] The McKean-Scovel operator is the simplest nonlinear Sturm-Liouville
operator acting on functions satisfying Dirichlet boundary conditions: its
nonlinearity is just taking the square of the incoming function. This text
contains a proof of a conjecture from the late 80: its critical set consists
only of Morin singularities, which attain arbitrary depth.
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Limit theorems for rare events in stochastic topologyZifu Wei (15420086) 02 December 2023 (has links)
<p>This dissertation establishes a variety of limit theorems pertaining to rare events in stochastic topology, exploiting probabilistic methods to study simplicial complex models. We focus on the filtration of \vc ech complexes and examine the asymptotic behavior of two topological functionals: the Betti numbers and critical faces. The filtration involves a parameter rn>0 that determines the growth rate of underlying Cech complexes. If rn depends also on the time parameter t, the obtained limit theorems will be established in a functional sense.</p>
<p>The first part of this dissertation is devoted to investigating the layered structure of topological complexity in the tail of a probability distribution. We establish the functional strong law of large numbers for Betti numbers, a basic quantifier of algebraic topology, of a geometric complex outside an open ball of radius Rn, such that Rn to infinity as the sample size n increases. The nature of the obtained law of large numbers is determined by the decay rate of a probability density. It especially depends on whether the tail of a density decays at a regularly varying rate or an exponentially decaying rate. The nature of the limit theorem depends also on how rapidly Rn diverges. In particular, if Rn diverges sufficiently slowly, the limiting function in the law of large numbers is crucially affected by the emergence of arbitrarily large connected components supporting topological cycles in the limit.</p>
<p>The second part of this dissertation investigates convergence of point processes associated with critical faces for a Cech filtration built over a homogeneous Poisson point process in the d-dimensional flat torus. The convergence of our point process is established in terms of the Mo-topology, when the connecting radius of a Cech complex decays to 0, so slowly that critical faces are even less likely to occur than those in the regime of threshold for homological connectivity. We also obtain a series of limit theorems for positive and negative critical faces, all of which are considerably analogous to those for critical faces.</p>
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Implementation And Performance Comparisons For The Crisfield And Stiff Arc Length Methods In FEASilvers, Thomas W. 01 January 2012 (has links)
In Nonlinear Finite Element Analysis (FEA) applied to structures, displacements at which the tangent stiffness matrix KT becomes singular are called critical points, and correspond to instabilities such as buckling or elastoplastic softening (e.g., necking). Prior to the introduction of Arc Length Methods (ALMs), critical points posed severe computational challenges, which was unfortunate since behavior at instabilities is of great interest as a precursor to structural failure. The original ALM was shown to be capable in some circumstances of continued computation at critical points, but limited success and unattractive features of the formulation were noted and addressed in extensive subsequent research. The widely used Crisfield Cylindrical and Spherical ALMs may be viewed as representing the 'state-of-the-art'. The more recent Stiff Arc Length method, which is attractive on fundamental grounds, was introduced in 2004, but without implementation, benchmarking or performance assessment. The present thesis addresses (a) implementation and (b) performance comparisons for the Crisfield and Stiff methods, using simple benchmarks formulated to incorporate elastoplastic softening. It is seen that, in contrast to the Crisfield methods, the Stiff ALM consistently continues accurate computation at, near and beyond critical points.
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Persistence in discrete Morse theory / Persistenz in der diskreten Morse-TheorieBauer, Ulrich 12 May 2011 (has links)
No description available.
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Critical Behavior On Approaching A Double Critical Point In A Complex MixturePradeep, U K 12 1900 (has links)
This thesis reports the results of light-scattering measurements and visual investigations of critical phenomena in the complex mixture 1-propanol (1P) + water (W) + potassium chloride (KCl) which has a special critical point (or a special thermodynamic state) known as the double critical point (DCP). The main theme of the thesis is the critical behavior on approaching a special critical point (i.e., the DCP) in a complex or associating mixture in contrast with that in simple, nonassociating mixtures. The asymptotic critical behavior in complex or associating fluids, such as polymer solutions and blends, ionic and nonionic micellar solutions, microemulsions, aqueous and nonaqueous electrolyte solutions, protein solutions, etc., is now commonly accepted to belong to the 3D-Ising universality class. However, the temperature range of the asymptotic regime in these fluids, with universal behavior, has a nonuniversal width and is, in general, smaller than that in simple or nonassociating fluids. In complex mixtures, which are made up of relatively large molecules or particle clusters of mesoscopic range, the coupling between the conventional correlation length of the critical fluctuations ( ξ) and an additional length scale associated with the mesoscale structures (ξD) is known to modify the approach towards the universal nonclassical critical behavior near their critical points. Nevertheless, the generality of this approach needs to be confirmed. There are also instances of a pure classical or close to classical behavior being observed in the critical domain of complex mixtures, although recent experimental results contradict the earlier observations. Therefore, further experimental evidences than that presently available are necessary before one can say how far the analogy between simple and complex fluids can be pushed. Variations in the effective dielectric constant of a mixture have been known to affect the critical behavior. Furthermore, we anticipate the presence of special critical points in complex mixtures to cause nontrivial modifications in the approach towards the universal asymptotic critical behavior. Special thermodynamic states are characterized by critical fluctuations with exceptionally large correlation length, and are displayed by multicomponent liquid mixtures, in which there are a multitude of thermodynamic paths by which a critical point can be approached, and offers rich information about the critical phenomena. These issues are being addressed in this research work. This thesis is organized into 7 Chapters.
Chapter 1 begins with an account of the historical development of the field of critical point phenomena with a brief introduction to critical phenomena in simple fluids. Critical phenomena observed in various complex systems such as aqueous and nonaqueous ionic fluids, polymer solutions and blends, micellar and microemulsion systems, etc., are discussed, with particular attention to investigations into crossover from Ising to mean-field critical behavior observed in these systems, which are relevant to the present work. Theoretical attempts at modeling ionic criticality are cited and summarized. This is followed by a discussion of re-entrant phase transitions in multicomponent liquid systems. An account of the various types of special critical points, such as double critical point, critical double point, critical inflection point, quadruple critical point, etc., highlighting the critical behavior on approaching these special critical points, and some of the models of reentrant miscibility are briefly given. The Chapter ends with a statement on the goals of the present research work.
Chapter 2 describes the instrumentation developed and the data acquisition procedures adopted for the study. Details of the thermostats and precision temperature controllers used for visual and light-scattering measurements are provided. The important design considerations relating to the achievement of a high degree of temperature stability (~ ±1 mK in the range 293-383 K) are elucidated clearly. The temperature sensors used in the present experiments and their calibration procedures are discussed. The light-scattering instrumentation is discussed in depth. The problems associated with the light-scattering techniques when it is used to study critical point phenomena, and the strategies adopted to overcome them are discussed. The sample cells used for visual investigations and light- scattering experiments, along with the procedure adopted for cleaning and filling of sample cells are also described.
Chapter 3 essentially deals with the characterization of the system 1P + W + KCl. It begins with a brief introduction to the critical behavior in complex mixtures, and the motivation behind choosing the present system. The phase behavior in the present mixture, the generation of the coexistence curves and the line of critical points in the mixture, and the method used for preparation of the samples are described. The criticality of the samples is judged by the equal volume phase separation criterion through visual investigations. Addition of a small amount of salt (i.e., KCl) to the 1P + W solution induces phase separation in the mixture as a result of a salting-out process. Decreasing the salt concentration has the same effect as that of increasing pressure on the liquid-liquid demixing of this mixture. Therefore, KCl may be considered as an appropriate field variable analogous to pressure in this mixture. The mixture 1P + W + KCl exhibits reentrant phase transitions and has an array of lower (TL) and upper (TU) critical solution temperatures. It is found that the line of TL’s and TU’s, known as the line of critical points, merge (TU - TL = ΔT → 0) to form a special thermodynamic state known as the DCP. The DCP is approached as close as 509 mK (i.e., ΔT ~ 509 mK) in this work. An analysis of the critical line shows that it is roughly parabolic in shape, which is in consonance with the predictions of the lattice models and the Landau-Ginzburg theory of phase transition. In addition to the presence of a special critical point, various structure probing techniques like small angle X-ray scattering (SAXS), small angle neutron scattering (SANS), etc., indicate the presence of large-scale density inhomogeneities or clusters in 1P + W solution and its augmentation on adding small amount of KCl. Therefore, the present mixture provides a unique possibility to investigate the combined effects of molecular structuring as well as a special critical point on the critical behavior. Only a section of the coexistence surface of the mixture could be generated, owing to various experimental limitations and other problems inherent to the system. This limited further studies on the coexistence curves in the mixture.
Chapter 4 reports the critical behavior of osmotic susceptibility in the present mixture. The behavior of the susceptibility exponent is deduced from static light-scattering measurements, on approaching the lower critical solution temperatures (TL’s) along different experimental paths by varying t [ =| (T - T TL)/ TL|] from the lower one-phase region. The light-scattering data analysis emphasizes the need for correction-to-scaling terms for a proper description of the data over the investigated t range. Renormalization of the critical exponents is observed as the critical line is approached along certain special paths. Experimental evidence for the doubling of the extended scaling exponent Δ1 near the DCP is shown. There is no signature of Fisher renormalization in the values of the critical exponents. The data analysis yields very large magnitudes for the correction amplitudes A1 and A2, with the first-correction amplitude A1 being negative, signifying a nonmonotonic crossover behavior of the susceptibility exponent in the mixture. The magnitudes of the correction amplitudes are observed to increase gradually as TL approaches the DCP. The increasing need for extended scaling in the neighborhood of special critical points has been noted earlier in several aqueous electrolyte solutions, in polymer-solvent systems, etc. However, the magnitudes of the correction amplitudes were not as large as that in the present case.
Analysis of the effective susceptibility exponent γeff in terms of t indicate that, for the TL far away from the DCP, γeff displays a nonmonotonic crossover from its single limit 3D Ising value (~ 1.24) towards its mean-field value with increase in t. While for that closest to the DCP, γeff displays a sharp, nonmonotonic crossover from its nearly doubled 3D-Ising value (~ 2.39) towards its nearly doubled mean-field value (~ 1.84) with increase in t. For the in-between TL’s, the limiting value of γeff in the asymptotic as well as nonasymptotic regimes gradually increases towards the DCP. The renormalized Ising regime extends over a relatively larger t range for the TL closest to the DCP, and a trend towards shrinkage in the renormalized Ising regime is observed as TL shifts away from the DCP. Nevertheless, the crossover behavior to the mean-field limit extends well beyond t > 10¯2 for the TL’s studied. The crossover behavior is discussed in terms of the emergence of a new lengthscale ξD associated with the enhanced ion-induced clustering seen in the mixture, as revealed by various structure probing techniques, while the observed unique trend in the crossover is discussed in terms of the varying influence of the DCP on the critical behavior along the TL line. The discussion is extended to explain the observed critical behavior in various re-entrant systems having other special critical points. The extended renormalized Ising regime towards the DCP is also reflected in a decrease in the correlation length amplitude (ξ0) as TL approaches the DCP. It is observed that the first-correction amplitude A1 corresponding to fit using two correction terms becomes more negative as TL approaches the DCP, implying an increase in the value of the parameter ū of the crossover model [by Anisimov et al., Phys. Rev. Lett. 75, 3146 (1995)] as the DCP is approached. This increase in reflected in a trend towards a relatively sharp crossover behavior of γeff as TL shifts towards the DCP, i.e., towards the high temperature critical points.
The significance of the field variable tUL in understanding different aspects of reentrant phase transitions is manifested in the present system as well. Analysis of the data in terms of tUL led to the retrieval of universal values of the exponents for all TL’s. The effective susceptibility exponent as a function of tUL displays a nonmonotonic crossover from its asymptotic 3D-Ising value towards a value slightly lower than its nonasymptotic mean-field value of 1. The limited (TL _ T) range restricted such a behavior of the effective exponent (in terms of t as well as tUL) for the lowest TL. This feature of the effective susceptibility exponent is interpreted in terms of the possibility of a nonmonotonic crossover to the mean-field value from lower values in the nonasymptotic, high tUL region, as foreseen earlier in micellar systems. The effective susceptibility exponent in terms of tUL also indicates an increase in the sharpness of crossover towards the high temperature TL’s. An increase in the sharpness of crossover with polymer chain length has been observed in polymer solutions. Therefore, our results suggest the need for further composition and temperature-dependent study of molecular structuring in the present mixture. There is also a large decrease in the dielectric constant of the mixture towards the high temperature TL’s.
In Chapter 5 the light-scattering measurements are performed on approaching the DCP along the line of the upper critical solution temperatures (i.e., TU’s), by varying t [ = (T - TU )/ TU ] from the high temperature one-phase region in the mixture. A trend towards shrinkage in the simple scaling region is observed as TU shifts away from the DCP. Such a trend was not visible in the data analysis of the TL’s using the correction terms, due to the varying (TL - T) ranges. The light-scattering data analysis substantiates the existence of a nonmonotonic crossover behavior of the susceptibility exponent in the mixture. As with the TL’s, for the TU closest to the DCP, γeff displays a nonmonotonic crossover from its 3D-Ising value towards its nearly doubled mean-field value with increase in t. While for that far away from the DCP, γeff displays a nonmonotonic crossover from its single limit Ising value towards a value slightly lower than its mean-field value of 1 with increase in t. The limited (TL – T) range restricted such a behavior of γeff for the TL far away from the DCP, This feature of γeff in the nonasymptotic, high t region is yet again interpreted in terms of the possibility of a nonmonotonic crossover to the mean-field value from below. Unlike TL’s, the crossover behavior in the present case is pronounced and more sharp for all TU’s. However, the variation in the width of the renormalized Ising regime on approaching the DCP along the TU line is quite similar to that observed along the TL line. The crossover behavior is attributed to the strong ion-induced structuring seen in the mixture, while the observed trend in the crossover as TU shifts towards/away from the DCP is attributed to the varying influence of the DCP. The influence of the DCP on the critical behavior along the TU (or TL) line decreases as TU (or TL) shifts away from the DCP.
Our observations indicate an increase in the sharpness of crossover as the critical temperature shifts from TL towards TU, or in other words, as the critical point shifts towards higher temperatures. SANS measurements on the present mixture indicate no difference in the growth of mesoscale clusters in the lower and upper one-phase regions in the mixture. Hence, the observed increase in the sharpness of crossover towards the TU’s is very puzzling. The dielectric constant of the major constituent (i.e., water, ~ 62 %) of the present mixture decreases from around 80 to 63 as the critical temperature shifts from TL towards TU. Therefore, our results suggest the need to look at the crossover phenomena probably from two perspectives, namely, the solvent or dielectric effect and the clustering effect. The increase in the sharpness of the crossover behavior on approaching the high temperature critical points is probably related to the macroscopic property of the mixture, i.e., to the decrease in the dielectric constant of the mixture, while the actual nonmonotonic character of the crossover behavior is related to the microscopic property of the mixture, i.e., to the clustering effects, the extent of which determines the width of the asymptotic critical domain. However, this conclusion is somewhat subtle and calls for rigorous theoretical and experimental efforts to unravel the exact dependence of the crossover behavior on the dielectric constant.
Analysis using the field variable tUL in lieu of the conventional variable t led to the retrieval of unique, universal exponents for all TU’s irrespective of the ΔT value. For all TU’s, the effective susceptibility exponent in terms of tUL displays a nonmonotonic crossover from its asymptotic 3D-Ising value towards a value slightly lower than its nonasymptotic mean-field value of 1, as that observed in the t analysis of the effective exponent for the TU far away from the DCP. Like with the TL’s, the crossover behavior
extends over nearly the same tUL range for the TU’s studied. However, the crossover is again sharper when compared to the TL’s.
Chapter 6 reports light-scattering measurements (by heating as well as cooling) on a non phase-separating 1P + W + KCl mixture in the vicinity of the DCP. The results indicate that despite the lack of phase-separation or critical points, critical-phenomena-like fluctuations can still occur in homogeneous mixtures if they reside in some other direction than temperature or composition (like, pressure or salt concentration) of the phase diagram. Unlike earlier studies on non phase-separating mixtures, our results indicate a crossover behavior of the effective susceptibility exponent, in addition to the power-law behavior.
Chapter 7 sums up the major findings of the work reported in this thesis. It also presents a range of open problems that need to be explored further in order to fully understand the results that are reported in this thesis, especially, regarding the exact dependence of dielectric constant of the mixture on the character of the crossover behavior.
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Aplicação do método de linearização de Lyapunov na análise de uma dinâmica não linear para controle populacional do mosquito Aedes aegypti / Application of the Lyapunov linearization method in the analysis of a nonlinear dynamics for mosquito control population Aedes aegyptiMaranho, Luiz Cesar 20 August 2018 (has links)
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Previous issue date: 2018-08-20 / O mosquito Aedes aegypti é o principal vetor responsável por diversas arboviroses como a dengue, a febre amarela, o vírus zika e a febre chikungunya. Devido a sua resistência, adaptabilidade e proximidade ao homem, o Aedes aegypti é atualmente um dos maiores problemas de saúde pública no Brasil e nas Américas. Mesmo com os avanços e investimentos em pesquisas com vacinas, monitoramento, campanhas educativas e diversos tipos de controle deste vetor, ainda não existe um método eficaz para controlar e erradicar o mosquito. Portanto, esse trabalho destina-se ao auxílio na criação de estratégias para controlar esse agente transmissor, mediante a análise do espaço de estados e a estabilidade assintótica de uma dinâmica não linear para controle populacional do Aedes aegypti via a técnica de linearização de Lyapunov, além de apresentação de formas de prevenção e combate aos criadouros do mosquito. A dinâmica não linear proposta é uma dinâmica simplificada obtida de um modelo não linear existente na literatura, proposto por Esteva e Yang em 2005 e se baseia no ciclo de vida do mosquito, que é dividido em duas fases: fase imatura ou aquática (ovos, larvas e pupas) e fase alada (mosquitos adultos). Na fase adulta, os mosquitos são divididos em machos, fêmeas imaturas e fêmeas fertilizadas, sendo que a dinâmica proposta nesta dissertação de mestrado é baseada nos estudos efetuados por Reis desde 2016, obtendo um modelo simplificado no qual a soma das densidades das populações de fêmeas imaturas e fêmeas fertilizadas serão consideradas como fêmeas adultas. / The mosquito Aedes aegypti is the main vector responsible for several arboviruses such as dengue fever, yellow fever, zika virus and chikungunya fever. Due to its resistance, adaptability and proximity to humans, Aedes aegypti is currently one of the major public health problems in Brazil and the Americas. Even with the advances and investments in research with vaccines, monitoring, educational campaigns and various types of control of this vector, there is still no effective method to control and eradicate the mosquito. Therefore, this work is intended to aid in the creation of strategies to control this transmitting agent by analyzing the state space and the asymptotic stability of a nonlinear dynamics for population control of Aedes aegypti via the Lyapunov linearization technique to present ways of preventing and combating mosquito breeding sites. The proposed nonlinear dynamics is a simplified dynamics obtained from a nonlinear model existing in the literature, proposed by Esteva and Yang in 2005 and based on the life cycle of the mosquito, which is divided into two phases: immature or aquatic phase (eggs, larvae and pupae) and winged phase (adult mosquitoes). In the adult phase, mosquitoes are divided into males, immature females and fertilized females, and the dynamics proposed in this dissertation is based on studies carried out by Reis since 2016, obtaining a simplified model in which the sum of the densities of the populations of females immature and fertilized females will be considered as adult females.
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Vybrané geometrické vlastnosti trajektorií Brownova pohybu / On Selected Geometric Properties of Brownian Motion PathsHonzl, Ondřej January 2012 (has links)
Title: On Selected Geometric Properties of Brownian Motion Paths Author: Mgr. Ondřej Honzl E-mail Address: honzl@karlin.mff.cuni.cz Department: Department of Probability and Mathematical Statistics Supervisor: Prof. RNDr. Jan Rataj, CSc. E-mail Address: rataj@karlin.mff.cuni.cz Department: Mathematical Institute, Charles University Abstract: Our thesis is focused on certain geometric properties of Brownian motion paths. Firstly, it deals with cone points of Brownian motion in the plane and we show some connections between cone points and critical points of Brownian motion. The motivation of the study of critical points is provided by a pleasant behavior of the distance function outside of the set of these points. We prove the theorem on a non-existence of π+ cone points on fixed line. This statement leads us to the conjecture that there are only countably many critical points of the Brownian motion path in the plane. Next, the thesis discusses an asymptotic behavior of the surface area of r-neigh- bourhood of Brownian motion, which is called Wiener sausage. Using the proper- ties of a Kneser function, we prove the claim about the relation of the Minkowski content and S-content. As the consequence, we obtain a limit behavior of the surface area of the Wiener sausage almost surely in dimension d ≥ 3. Finally,...
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Existência de medidas invariantes para aplicações no intervalo com presença de pontos críticos e singularidadesMontoya, Jorge Luis Abanto 20 May 2016 (has links)
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Previous issue date: 2016-05-20 / CAPES - Coordenação de Aperfeiçoamento de Pessoal de Nível Superior / Provaremos a existência de medidas de probabilidade invariantes absolutamente contínuas
com respeito à medida de Lebesgue. Aqui trabalhamos com uma classe de funções que
denotamos por F, esta classe consiste de aplicações no intervalo f : M ! M, que possuem
pontos críticos e singularidades mais outras propriedades. É preciso mencionar que uma
das propriedades é a condição de somabilidade ao longo da órbita crítica que vai ajudar a
ter resultados importantes para nosso trabalho.
O resultado principal diz que, para cada f 2 F existe uma medida de probabilidade
invariante absolutamente contínua. Para conseguir este resultado, provaremos um teorema
auxiliar que trata da existência de uma partição enumerável I de intervalos abertos de M,
de uma aplicação que chamamos tempo induzido : M ! N que é constante nos elementos
da partição I, tal que a aplicação ˆ f : M ! M definida por ˆ f = f que chamamos aplicação
induzida, satisfaz três propriedades importantes que são, expansão, variação somável e
tempo induzido somável. Por isso ao longo do trabalho vamos concentrar em provar essas
três propriedades.
O ponto importante é que as duas primeiras propriedades junto com o teorema A garantem
a existência de uma medida de probabilidade absolutamente contínua para ˆ f, finalmente
utilizando a terceira propriedade junto com a proposição A, obtemos a existência de uma
medida de probabilidade absolutamente contínua para nossa f. / We prove the existence of invariant probability measures absolutely continuous with respect
to Lebesgue measure. Here we work with a class of maps that we denote by F, this class
consists of interval maps f : M ! M, having critical points and singularities more other
properties. I must mention that one of the properties is the condition of summability
along the critical orbit which will help to have important results for our work.
The main result says, for each f 2 F there is a probability measure invariant absolutely
continuous. To achieve this result, we prove an auxiliary theorem that is the existence of a
countable partition I of open intervals of M, an map that called induced time : M ! N
that is constant on the elements of the partition I, such that the map ˆ f : M ! M defined
by ˆ f = f we call induced map, satisfies three important properties that are, expanding,
summable variation and summable induced time. So throughout the work we focus on
evidence these three properties.
The important point is that the first two properties together with theorem A ensures the
existence of a measure absolutely continuous probability ˆ f, finally using the third property
together with proposition A, we get the existence of an absolutely continuous probability
measure for our f.
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Complexes de type Morse et leurs équivalencesMorin, Audrey 04 1900 (has links)
L'obtention de ce mémoire a été rendue possible par le soutien financier du FRQNT et du CRSNG. / Ce mémoire est une étude détaillée de certains aspects de la théorie de Morse
et des complexes de chaînes qui en découlent : le complexe de Morse, le complexe
de Milnor et le complexe de Barraud-Cornea. À l’aide de différentes techniques
de la topologie différentielle et de la théorie de Morse, dont les bases forment les
premiers chapitres de ce texte, nous ferons la construction détaillée de ces trois
complexes avant de démontrer leurs équivalences deux à deux. Ce mémoire synthétise
et met en parallèle trois branches de la théorie de Morse en ne supposant
que des connaissances du niveau d’un étudiant de début maîtrise. / In this thesis, we study aspects of Morse theory and the chain complexes that
derive from it : the Morse complex, the Milnor complex and the Barraud-Cornea
complex. Using different techniques from differential topology and Morse theory,
which will be presented in the first chapters, we carefully build these complexes before
proving their equivalence. This thesis synthesises and compares three points
of view in Morse theory in a document accessible to beginning graduate students.
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