A Refined Global Poincaré–Bendixson Annulus with the Limit Cycle of the Rayleigh System

Pub Date : 2024-09-19 DOI:10.1134/s0012266124060028
Y. Li, A. A. Grin, A. V. Kuzmich
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Abstract

New methods for constructing two Dulac–Cherkas functions are developed using which a better, depending on the parameter \(\lambda >0\), inner boundary of the Poincaré–Bendixson annulus \(A(\lambda ) \) is found for the Rayleigh system. A procedure is proposed for directly finding a polynomial whose zero level set contains a transversal oval used as the outer boundary of \(A(\lambda )\). An interval for \(\lambda \) is specified with which the best outer boundary of the annulus \( A(\lambda )\) is a closed contour composed of two arcs of the constructed oval and two arcs of unclosed curves of the zero level set of one of the Dulac–Cherkas functions. Thus, a refined global Poincaré–Bendixson annulus for the limit cycle of the Rayleigh system is presented.

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具有瑞利系统极限周期的精炼全局波因卡-本迪克森环面
摘要 提出了构造两个杜拉克-切尔卡斯函数的新方法,利用这些方法,可以根据参数(((lambda >0\))为瑞利系统找到更好的Poincaré-Bendixson环面(A(\lambda ) \)的内边界。提出了一个直接找到多项式的程序,该多项式的零级集包含一个用作(A(\lambda))外边界的横向椭圆。为 \(\lambda \)指定了一个椭圆,环形 \( A(\lambda )\) 的最佳外边界是由所建椭圆的两条弧和杜拉克-切尔卡斯函数之一的零级集的未封闭曲线的两条弧组成的封闭轮廓。因此,我们提出了雷利系统极限周期的精炼全局 Poincaré-Bendixson 环面。
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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