用平均法求Liénard多项式系统类型的极限环

Q3 Mathematics Moroccan Journal of Pure and Applied Analysis Pub Date : 2020-05-29 DOI:10.2478/mjpaa-2020-0001

A. Boulfoul, Nawal Mellahi

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引用次数: 0

摘要

摘要我们应用一阶和二阶平均理论研究形式为x*=y-1（x）y的广义多项式Linard系统的极限环， y*=-x-f（x）-g（x）y-h（x）y2，\dot x=y-1\left（x\right）y，\，\，\dot y=-x-f\left（x\ right）-g\left（x \ right）y-h\left（y\right；2g2（x）和h（x）=∊h1（x）+\8714；2h2（x），其中lk（x）具有度m，fk（x）、gk（x和hk（x。

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Limit cycles of Liénard polynomial systems type by averaging method

Abstract We apply the averaging theory of first and second order for studying the limit cycles of generalized polynomial Linard systems of the form x˙=y-1(x)y, y˙=-x-f(x)-g(x)y-h(x)y2, \dot x = y - 1\left( x \right)y,\,\,\dot y = - x - f\left( x \right) - g\left( x \right)y - h\left( x \right){y^2}, where l(x) = ∊l1(x) + ∊2l2(x), f (x) = ∊ f1(x) + ∊2 f2(x), g(x) = ∊g1(x) + ∊2g2(x) and h(x) = ∊h1(x) + ∊2h2(x) where lk(x) has degree m and fk(x), gk(x) and hk(x) have degree n for each k = 1, 2, and ∊ is a small parameter.

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