On the Use of the Schwarzian derivative in Real One-Dimensional Dynamics

arXiv - MATH - Dynamical Systems Pub Date : 2024-09-02 DOI:arxiv-2409.00959
Felipe Correa, Bernardo San Martín
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Abstract

In the study of properties within one-dimensional dynamics, the assumption of a negative Schwarzian derivative has been shown to be very useful. However, this condition may appear somewhat arbitrary, as it is not a dynamical condition in any sense other than that it is preserved for its iterates. In this brief work, we show that the assumption of a negative Schwarzian derivative it is not entirely arbitrary but rather strictly related to the fulfillment of the Minimum Principle for the derivative of the map and its iterates, which is the key point in the proof of Singer's Theorem.
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论实数一维动力学中施瓦茨导数的使用
在一维动力学性质的研究中,负施瓦茨导数的假设被证明是非常有用的。然而,这一条件可能显得有些武断,因为它除了在其迭代中得到保留之外,在任何意义上都不是动力学条件。在这篇简短的论文中,我们将证明负施瓦茨导数的假设并非完全武断,而是与映射及其迭代导数的最小原则的充分实现密切相关,而这正是辛格定理证明中的关键点。
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arXiv - MATH - Dynamical Systems
arXiv - MATH - Dynamical Systems
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