ELEMENTARY GRAPHICS OF CYCLICITY-1 AND CYCLICITY-2

被引:51
作者
DUMORTIER, F
ROUSSARIE, R
ROUSSEAU, C
机构
[1] DEPT MATH, TOPOL LAB, URA 755, F-21004 DIJON, FRANCE
[2] UNIV MONTREAL, DEPT MATH, MONTREAL H3C 3J7, QUEBEC, CANADA
[3] UNIV MONTREAL, CRM, MONTREAL H3C 3J7, QUEBEC, CANADA
来源
NONLINEARITY | 1994年 / 7卷 / 03期
关键词
D O I
10.1088/0951-7715/7/3/013
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
In this paper we elaborate the techniques to prove for several elementary graphics that their cyclicity is one or two. We first prove two main results for C(infinity) vector fields in general. The first one states that a graphic through an arbitrary number of attracting hyperbolic saddles (hyperbolicity ratio r > 1) and attracting semi-hyperbolic points (one negative eigenvalue) has cyclicity 1. A second result says that for a graphic with one hyperbolic and one semi-hyperbolic singularity of opposite character the cyclicity is two. We then specialize to graphics with fixed connections and show that 33 graphics appearing among quadratic systems and listed in a previous paper have a cyclicity at most two (five cases are done only under generic conditions).
引用
收藏
页码:1001 / 1043
页数:43
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