A piecewise contractive map on triangles

Samuel Everett
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Abstract

We study the dynamics of a piecewise map defined on the set of three pairwise nonparallel, nonconcurrent lines in $\mathbb{R}^2$. The geometric map of study may be analogized to the billiard map with a different reflection rule so that each iteration is a contraction over the space, thereby providing asymptotic behavior of interest. Our study emphasizes the behavior of periodic orbits generated by the map, with description of their geometry and bifurcation behavior. We establish that for any initial point in the space, the orbit will converge to a fixed point or periodic orbit, and we demonstrate that there exists an infinite variety of periodic orbits the orbits may converge to, dependent on the parameters of the underlying space.
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三角形上的片断收缩映射
我们研究的是定义在 $\mathbb{R}^2$ 中三条平行、非并行线的对偶线集合上的片断映射的动力学。所研究的几何映射可类比于台球映射,其反射规则不同,因此每次迭代都是对空间的收缩,从而提供了感兴趣的渐近行为。我们的研究强调了由台球图产生的周期轨道的行为,并描述了它们的几何和分岔行为。我们确定,对于空间中的任何初始点,轨道都将收敛到一个固定点或周期轨道,而且我们证明,轨道可能收敛到的周期轨道存在无限种,这取决于底层空间的参数。
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