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Some Dynamic and Combinatorial Properties of One Parameter Families of Unimodal Maps with Monotonicity

Some Dynamic and Combinatorial Properties of One Parameter Families of Unimodal Maps with Monotonicity
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摘要 It is known that certain one parameter families of unimodal maps of the interval have a topological universality with regard to their dynamic behavior [ 1, 2]. As a parameter is smoothly increased, a fascinating variety of dynamic behaviors are produced. For some families the behaviors are monotonic in the parameter, while in others they are not [3]. The question is what sort of conditions on a one parameter family will ensure this monotonicity of the behavior with the parameter? The answer is unknown and will not be given here. What we do instead is to investigate certain geometric-dynamic-combinatorial consequences of assuming that the family has this monotonicity. Specifically, using tools of symbolic dynamics, state space is "course grained" with a finite alphabet. We decompose a non-invertible map into nonlinear but invertible pieces. From these invertible pieces, we form inverse maps via composition along words. Equations of motion are developed for both forward and inverse orbits (in both the variables of state space and the parameter), and an equation relating forward and inverse motions at fix-points is exhibited. Finally, we deduce a list of conditions, each of which is equivalent to monotone behavior. One of these conditions states that simple parity characteristics of words correspond to definite dynamics near fixed-points and vice versa.
作者 John Taylor
出处 《Journal of Mathematics and System Science》 2013年第6期301-308,共8页 数学和系统科学(英文版)
关键词 One parameter family unimodal map kneading theory connection equation. 单峰映射 单调性 组合特性 动态行为 符号动力学 状态空间 时间间隔 动态组合
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参考文献6

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