一类五次多项式微分系统的全局中心

Leonardo P. C. da Cruz, Jaume Llibre
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A centre <jats:inline-formula> <jats:alternatives> <jats:tex-math>$p$</jats:tex-math> <jats:inline-graphic xmlns:xlink=\"http://www.w3.org/1999/xlink\" mime-subtype=\"png\" xlink:href=\"S030821052400043X_inline5.png\" /> </jats:alternatives> </jats:inline-formula> is global when <jats:inline-formula> <jats:alternatives> <jats:tex-math>$ {\\mathbb {R}}^2\\setminus \\{p\\}$</jats:tex-math> <jats:inline-graphic xmlns:xlink=\"http://www.w3.org/1999/xlink\" mime-subtype=\"png\" xlink:href=\"S030821052400043X_inline6.png\" /> </jats:alternatives> </jats:inline-formula> is filled with periodic orbits. In general, it is a difficult problem to distinguish the centres from the foci for a given class of differential systems, and also it is difficult to distinguish the global centres inside the centres. 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C. da Cruz, Jaume Llibre\",\"doi\":\"10.1017/prm.2024.43\",\"DOIUrl\":null,\"url\":null,\"abstract\":\"A centre of a differential system in the plane <jats:inline-formula> <jats:alternatives> <jats:tex-math>$ {\\\\mathbb {R}}^2$</jats:tex-math> <jats:inline-graphic xmlns:xlink=\\\"http://www.w3.org/1999/xlink\\\" mime-subtype=\\\"png\\\" xlink:href=\\\"S030821052400043X_inline1.png\\\" /> </jats:alternatives> </jats:inline-formula> is an equilibrium point <jats:inline-formula> <jats:alternatives> <jats:tex-math>$p$</jats:tex-math> <jats:inline-graphic xmlns:xlink=\\\"http://www.w3.org/1999/xlink\\\" mime-subtype=\\\"png\\\" xlink:href=\\\"S030821052400043X_inline2.png\\\" /> </jats:alternatives> </jats:inline-formula> having a neighbourhood <jats:inline-formula> <jats:alternatives> <jats:tex-math>$U$</jats:tex-math> <jats:inline-graphic xmlns:xlink=\\\"http://www.w3.org/1999/xlink\\\" mime-subtype=\\\"png\\\" xlink:href=\\\"S030821052400043X_inline3.png\\\" /> </jats:alternatives> </jats:inline-formula> such that <jats:inline-formula> <jats:alternatives> <jats:tex-math>$U\\\\setminus \\\\{p\\\\}$</jats:tex-math> <jats:inline-graphic xmlns:xlink=\\\"http://www.w3.org/1999/xlink\\\" mime-subtype=\\\"png\\\" xlink:href=\\\"S030821052400043X_inline4.png\\\" /> </jats:alternatives> </jats:inline-formula> is filled with periodic orbits. 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引用次数: 0

摘要

平面 $ {\mathbb {R}}^2$ 中微分系统的中心是一个平衡点 $p$,它有一个邻域 $U$,使得 $Usetminus \{p\}$充满了周期性的轨道。当 $ {\mathbb {R}}^2\setminus \{p\}$ 充满周期性轨道时,中心 $p$ 是全局的。一般来说,对于给定类别的微分系统,区分中心和焦点是一个难题,而区分中心内部的全局中心也很困难。本文的目标是对以下一类五次多项式微分系统的中心和全局中心进行分类 \begin{align*}\dot{x}= y,quad \dot{y}={-}x+a_{05}\,y^5+a_{14}\,x\,y^4+a_{23}\,x^2\,y^3+a_{32}\,x^3\,y^2+a_{41}\,x^4\,y+a_{50}\,x^5, \end{align*} 在平面 $ {\mathbb {R}}^2$ 中。
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Global centres in a class of quintic polynomial differential systems
A centre of a differential system in the plane $ {\mathbb {R}}^2$ is an equilibrium point $p$ having a neighbourhood $U$ such that $U\setminus \{p\}$ is filled with periodic orbits. A centre $p$ is global when $ {\mathbb {R}}^2\setminus \{p\}$ is filled with periodic orbits. In general, it is a difficult problem to distinguish the centres from the foci for a given class of differential systems, and also it is difficult to distinguish the global centres inside the centres. The goal of this paper is to classify the centres and the global centres of the following class of quintic polynomial differential systems \begin{align*} \dot{x}= y,\quad \dot{y}={-}x+a_{05}\,y^5+a_{14}\,x\,y^4+a_{23}\,x^2\,y^3+a_{32}\,x^3\,y^2+a_{41}\,x^4\,y+a_{50}\,x^5, \end{align*} in the plane $ {\mathbb {R}}^2$ .
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来源期刊
CiteScore
3.00
自引率
0.00%
发文量
72
审稿时长
6-12 weeks
期刊介绍: A flagship publication of The Royal Society of Edinburgh, Proceedings A is a prestigious, general mathematics journal publishing peer-reviewed papers of international standard across the whole spectrum of mathematics, but with the emphasis on applied analysis and differential equations. An international journal, publishing six issues per year, Proceedings A has been publishing the highest-quality mathematical research since 1884. Recent issues have included a wealth of key contributors and considered research papers.
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