表面上矢量场的闪亮鞍形环

IF 0.9 3区数学 Q2 MATHEMATICS, APPLIED

Bulletin des Sciences Mathematiques Pub Date : 2025-09-29 DOI:10.1016/j.bulsci.2025.103742

Ivan Shilin

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引用次数: 0

摘要

研究了一般单参数族中带柄的2流形上向量场的分岔问题，用双曲鞍形的分离矩阵环展开向量场。这些分岔与球上类似的分岔有很大的不同。其原因是，在一个表面上，双曲鞍形的自由分离矩阵可以绕向同一鞍形的分离矩阵环。当这个环被打破时，闪亮的鞍形环就会出现。在可定向的情况下，与这些回路相对应的参数值形成了分岔图中包含的康托集中的间隙的端点。由于Cantor集的存在，与球面上的分岔相比，即使在一般的单参数族中，也存在着分岔图的拓扑非等价芽的可数集合。

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Sparkling saddle loops of vector fields on surfaces

We study bifurcations of vector fields on 2-manifolds with handles in generic one-parameter families unfolding vector fields with a separatrix loop of a hyperbolic saddle. These bifurcations can differ drastically from the analogous bifurcations on the sphere. The reason is that, on a surface, a free separatrix of a hyperbolic saddle may wind toward the separatrix loop of the same saddle. When this loop is broken, sparkling saddle loops emerge. In the orientable case, the parameter values corresponding to these loops form the endpoints of the gaps in a Cantor set contained within the bifurcation diagram. Due to the presence of a Cantor set, there is a countable set of topologically non-equivalent germs of bifurcation diagrams even in generic one-parameter families, in contrast to bifurcations on the sphere.

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