The two-dimensional border-collision normal form with a zero determinant

David J. W. Simpson
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Abstract

The border-collision normal form is a piecewise-linear family of continuous maps that describe the dynamics near border-collision bifurcations. Most prior studies assume each piece of the normal form is invertible, as is generic from an abstract viewpoint, but in applied problems one piece of the map often has degenerate range, corresponding to a zero determinant. This provides simplification, yet even in two dimensions the dynamics can be incredibly rich. The purpose of this paper is to determine broadly how the dynamics of the two-dimensional border-collision normal form with a zero determinant differs for different values of its parameters. We identify parameter regions of period-adding, period-incrementing, mode-locking, and component doubling of chaotic attractors, and characterise the dominant bifurcation boundaries. The intention is for the results to enable border-collision bifurcations in mathematical models to be analysed more easily and effectively, and we illustrate this with a flu epidemic model and two stick-slip friction oscillator models. We also describe three novel bifurcation structures that remain to be explored.
行列式为零的二维边界碰撞正则表达式
边界碰撞正态势是描述边界碰撞分岔附近动态的连续图的片线性族。大多数先前的研究都假定法线形式的每个片段都是可逆的,这从抽象的角度来看是通用的,但在应用问题中,映射的一个片段往往具有退化范围,对应于行列式为零。本文的目的是大致确定具有零行列式的二维边界碰撞正态势在不同参数值下的动态有何不同。我们确定了周期增加、周期增加、模式锁定和分量加倍的混沌吸引子的参数区域,并描述了主要的分岔边界。我们用一个流感流行病模型和两个粘滑摩擦振荡器模型证明了这一点。我们还描述了三种有待探索的新型分岔结构。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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