平面上实解析向量场的分离度

Pub Date : 2019-11-28 DOI:10.17323/1609-4514-2022-22-4-595-611

E. Cabrera, Rogério Mol

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引用次数: 1

摘要

设$X$为在$({\mathbb R}^{2},0)$处具有代数孤立奇点的实解析向量场的胚芽。如果$X$的奇异性约简中不存在拓扑鞍节点，则称其为拓扑广义曲线。在这种情况下，我们证明了如果阶$\nu_{0}(X)$或米尔诺数$\mu_{0}(X)$是偶的，那么$X$有一个形式分离矩阵，即在$0 \in {\mathbb R}^{2}$处有一个形式不变曲线。这个结果是最优的，因为这些假设不能保证存在一个收敛的分离矩阵。

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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Separatrices for Real Analytic Vector Fields in the Plane

Let $X$ be a germ of real analytic vector field at $({\mathbb R}^{2},0)$ with an algebracally isolated singularity. We say that $X$ is a topological generalized curve if there are no topological saddle-nodes in its reduction of singularities. In this case, we prove that if either the order $\nu_{0}(X)$ or the Milnor number $\mu_{0}(X)$ is even, then $X$ has a formal separatrix, that is, a formal invariant curve at $0 \in {\mathbb R}^{2}$. This result is optimal, in the sense that these hypotheses do not assure the existence of a convergent separatrix.

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