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11	Dynamics of holomorphic correspondences / Dinâmica de correspondências holomorfas Carlos Alberto Siqueira Lima 22 June 2015 (has links) We generalize the notions of structural stability and hyperbolicity for the family of (multivalued) complex maps Hc(z) = zr + c; where r > 1 is rational and zr = exp r log z: We discovered that Hc is structurally stable at every hyperbolic parameter satisfying the escaping condition. Surprisingly, there may be infinitely many attracting periodic points for Hc. The set of such points gives rise to the dual Julia set, which is a Cantor set coming from a Conformal Iterated Funcion System. Both the Julia set and its dual are projections of holomorphic motions of dynamical systems (single valued maps) defined on compact subsets of Banach spaces, denoted by Xc and Wc, respectively. For c close to zero: (1) we show that Jc is a union of quasiconformal arcs around the unit circle; (2) the set Xc is an holomorphic motion of the solenoid X0; (3) using the formalism of Gibbs states we exhibit an upper bound for the Hausdorff dimension of Jc; which implies that Jc has zero Lebesgue measure. / Generalizamos as noções de estabilidade estrutural e hiperbolicidade para a família de correspondências holomorfas Hc(z) = zr + c; onde r > 1 é racional e zr = exp r log z: Descobrimos que Hc é estruturalmente estável em todos os parâmetros hiperbólicos satisfazendo a condição de fuga. Tipicamente Hc possui infinitos pontos periódicos atratores, fato totalmente inesperado, uma vez que este número é sempre finito para aplicações racionais. O conjunto de tais pontos dá origem ao chamado conjunto de Julia dual, que é um conjunto de Cantor proveniente de um Conformal Iterated Function System. Tanto o conjunto de Julia e quanto seu dual são projeções de movimentos holomorfos de sistemas definidos em subconjuntos compactos denotados por Xc e Wc; respectivamente de um espaço de Banach. Para todo c próximo de zero: (1) mostramos que Jc é reunião de arcos quase-conformes próximos do círculo unitário; (2) o conjunto Xc é um movimento holomorfo do solenóide X0; (3) utilizando o formalismo dos estados de Gibbs, exibimos um limitante superior para a dimensão de Hausdorff de Jc. Consequentemente, Jc possui medida de Lebesgue nula. Conjunto de Julia Dinâmica complexa Estabilidade estrutural Hiperbolicidade Movimentos holomorfos Complex dynamics Holomorphic motions Hyperbolocity Julia set Structural stability
12	On the Stability of Julia Sets of Functions having Baker Domains / Über die Stabilität von Juliamengen von Funktionen mit Bakergebieten Lauber, Arnd 14 July 2004 (has links) No description available. 510 Mathematik Mathematics and Computer Science Juliamenge Fatoumenge Bakergebiet Stabilität Parameterebene Mandelbrotmenge Julia set Fatou set Baker domain Mandelbrot set parameter plane 31.42 E
13	Random Iterations of Subhyperbolic Relaxed Newton's Methods / Zufällige Iterationen subhyperbolischer Eulerscher Verfahren Arghanoun, Ghazaleh 14 April 2004 (has links) No description available. 510 Mathematik Mathematics and Computer Science Juliamenge Fatoumenge Eulersches Verfahren zufällige Iteration Subhyperbolizität quasikonforme Chirurgie Julia set Fatou set relaxed Newtons method random iteration subhyperbolicity quasiconformal surgery 31.42 E
14	Connectivity of Julia sets of transcendental meromorphic functions Taixés i Ventosa, Jordi 22 September 2011 (has links) Newton's method associated to a complex holomorphic function f is defined by the dynamical system Nf(z) = z – f(z) / f'(z). As a root-finding algorithm, a natural question is to understand the dynamics of Nf about its fixed points, as they correspond to the roots of the function f. In other words, we would like to understand the basins of attraction of Nf, i.e., the sets of points that converge to a root of f under the iteration of Nf. Basins of attraction are actually just one type of stable component or component of the Fatou set, defined as the set of points for which the family of iterates is defined and normal locally. The Julia set or set of chaos is its complement (taken on the Riemann sphere). The study of the topology of these two sets is key in Holomorphic Dynamics. In 1990, Mitsuhiro Shishikura proved that, for any non-constant polynomial P, the Julia set of NP is connected. In fact, he obtained this result as a consequence of a much more general theorem for rational functions: If the Julia set of a rational function R is disconnected, then R has at least two weakly repelling fixed points. With the final goal of proving the transcendental version of this theorem, in this Thesis we see that: If a transcendental meromorphic function f has either a multiply-connected attractive basin, or a multiply-connected parabolic basin, or a multiply-connected Fatou component with simply-connected image, then f has at least one weakly repelling fixed point. Our proof for this result is mainly based in two techniques: quasiconformal surgery and the study of the existence of virtually repelling fixed points. We conclude the Thesis with an idea of the strategy for the proof of the case of Herman rings, as well as some ideas for the case of Baker domains, which is left as a subject for a future project. Connectivitat Meromorfa Trascendent Conjunt de Julia Dinàmica complexa Sistemes dinàmics Holomorf Connectivity Meromorphic Transcendental Julia set Complex dynamics Dynamical systems Holomorphic Ciències Experimentals i Matemàtiques 51
15	Máquina de somar, conjuntos de Julia e fractais de Rauzy Uceda, Rafael Asmat [UNESP] 15 March 2011 (has links) (PDF) Made available in DSpace on 2014-06-11T19:32:22Z (GMT). No. of bitstreams: 0 Previous issue date: 2011-03-15Bitstream added on 2014-06-13T21:04:11Z : No. of bitstreams: 1 uceda_ra_dr_sjrp.pdf: 905373 bytes, checksum: c2f0ae66c1c9b9621f826e692c6d9b4c (MD5) / Fundação de Amparo à Pesquisa do Estado de São Paulo (FAPESP) / Em 2000, Killeen e Taylor definiram a máquina de somar estocástica em base 2. Eles mostraram que o espectro do op erador de transi cão (agindo em l∞( N)), associado a essa máquina, e igual ao conjunto de Julia cheio de uma função quadrática. Nesse trabalho, estudamos outras propriedades espectrais e topológicass da máquina de Killeen e Taylor, e também das suas extensões à l∞(Z) e a outras bases não constantes. Esse estudo envolve conjuntos de Julia de funções quadráticas e também conjuntos de Julia cheios de endomor smos de C2 . Finalmente estudamos algumas propriedades aritméticas e topológicas de uma classe de fractais de Rauzy. Em particular estudamos o azulejamento periódico do plano complexo C induzido por eles. / In 2000, Killeen and Taylor de ned the sto hastic adding machine in base 2. They proved that the sp ectrum of the transition op erator (acting in l∞(N )) asso ciated to this machine is equal to the lled Julia set of a quadratic polynomial map. In this work, we study other sp ectral and top ological prop erties of Killeen and Taylor machine, and also of its extensions to l∞( Z) and to other non constant bases. This study envolves Julia sets of quadratic maps and also lled Julia sets of endomorphisms of C2 . Finally we study some arithmetical and topological prop erties of a class of Rauzy fractals. In particular we study the p erio dictiling of complex plane C induced by this class. Sistemas dinâmicos diferenciais Fractais Processos de Markov Máquinas de somar Sistemas dinâmicos discretos Conjuntos de Julia Fractais de Rauzy Adding machine Markov chains Transition operator Spectrum Julia set Rauzy fractal
16	Julia Set as a Martin Boundary / Julia Set as a Martin Boundary Islam, Md. Shariful 05 July 2010 (has links) No description available. 510 Mathematik Mathematics and Computer Science Julia set Hyperbolic rational functions Martin boundary Markov chain Entropy Gibbs measure Measure of maximal entropy Dirichlet problem Julia set Hyperbolic rational functions Martin boundary Markov chain Entropy Gibbs measure Measure of maximal entropy Dirichlet problem Analysis: Allgemeines
17	The Dynamics of Twisted Tent Maps Chamblee, Stephen Joseph 12 July 2013 (has links) Indiana University-Purdue University Indianapolis (IUPUI) / This paper is a study of the dynamics of a new family of maps from the complex plane to itself, which we call twisted tent maps. A twisted tent map is a complex generalization of a real tent map. The action of this map can be visualized as the complex scaling of the plane followed by folding the plane once. Most of the time, scaling by a complex number will \twist" the plane, hence the name. The "folding" both breaks analyticity (and even smoothness) and leads to interesting dynamics ranging from easily understood and highly geometric behavior to chaotic behavior and fractals. twisted tent map complex dynamical system dynamics fractal coded-coloring escape-time fold folding reflect filled-in Julia set twisted tent map TTM complex plane polygon Fractals Julia sets Symbolic dynamics Twist mappings (Mathematics) Chaotic behavior in systems
18	Fraktály v počítačové grafice / Fractals in Computer Graphics Heiník, Jan Unknown Date (has links) This Master's thesis deals with history of Fractal geometry and describes the fractal science development. In the begining there are essential Fractal science terms explained. Then description of fractal types and typical or most known examples of them are mentioned. Fractal knowledge application besides computer graphics area is discussed. Thesis informs about fractal geometry practical usage. Few present software packages or more programs which can be used for making fractal pictures are described in this work. Some of theirs capabilities are described. Thesis' practical part consists of slides, demonstrational program and poster. Electronical slides represents brief scheme usable for fractal geometry realm lectures. Program generates selected fractal types. Thesis results are projected on poster.

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