Attracting dynamics of exponential maps.
Schleicher, Dierk (2003)
Annales Academiae Scientiarum Fennicae. Mathematica
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Displaying similar documents to “Trees of visible components in the Mandelbrot set”
Attracting dynamics of exponential maps.
Periodic points and dynamic rays of exponential maps.
Schleicher, Dierk, Zimmer, Johannes (2003)
Annales Academiae Scientiarum Fennicae. Mathematica
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C¹-maps having hyperbolic periodic points
N. Aoki, Kazumine Moriyasu, N. Sumi (2001)
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We show that the C¹-interior of the set of maps satisfying the following conditions: (i) periodic points are hyperbolic, (ii) singular points belonging to the nonwandering set are sinks, coincides with the set of Axiom A maps having the no cycle property.
Periodic solutions of
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Solvability Of Operator Equations And Periodic Solutions Of Semilinear Hyperbolic Equations
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Equicontinuity of iterates of circle maps.
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Inverse limits on intervals using unimodal bonding maps having only periodic points whose periods are all the powers of two
W. Ingram, Robert Roe (1999)
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We derive several properties of unimodal maps having only periodic points whose period is a power of 2. We then consider inverse limits on intervals using a single strongly unimodal bonding map having periodic points whose only periods are all the powers of 2. One such mapping is the logistic map, = 4λx(1-x) on [f(λ),λ], at the Feigenbaum limit, λ ≈ 0.89249. It is known that this map produces an hereditarily decomposable inverse limit with only three topologically different subcontinua....