里卡提二次微分系统的全局分析

Joan C. Artés, J. Llibre, D. Schlomiuk, N. Vulpe
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摘要

本文研究二次里卡提微分方程系。我们的目标是在平面的波恩卡莱圆盘压缩上获得该族的完整拓扑分类。以前曾对该族进行过部分研究,但从未从真正的全局角度进行过研究。我们的方法是全局性的,我们利用几何来实现我们的目标。我们进行的几何分析是通过在任何通用里卡提系统中存在两条不变的平行直线来实现的。我们总共得到了 119 个拓扑学上不同的相位肖像。此外,我们用不变多项式给出了该族 12 维参数空间中的完整分岔图,这意味着它与系统可能呈现的正常形式无关。该分岔图提供了一种算法,可用于判定任何给定二次方程系统的任何呈现形式是否为里卡提系统,如果是,则提供其相位图。
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Global Analysis of Riccati Quadratic Differential Systems
In this paper, we study the family of quadratic Riccati differential systems. Our goal is to obtain the complete topological classification of this family on the Poincaré disk compactification of the plane. The family was partially studied before but never from a truly global viewpoint. Our approach is global and we use geometry to achieve our goal. The geometric analysis we perform is via the presence of two invariant parallel straight lines in any generic Riccati system. We obtain a total of 119 topologically distinct phase portraits for this family. Furthermore, we give the complete bifurcation diagram in the 12-dimensional space of parameters of this family in terms of invariant polynomials, meaning that it is independent of the normal forms in which the systems may be presented. This bifurcation diagram provides an algorithm to decide for any given quadratic system in any form it may be presented, whether it is a Riccati system or not, and in case it is to provide its phase portrait.
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