ON THE INTEGRABILITY OF POLYNOMIAL VECTOR FIELDS IN THE PLANE BY MEANS OF PICARD-VESSIOT THEORY

PRIMITIVO B. ACOSTA-HUMÁNEZ; J. TOMÁS LÁZARO; Juan J. Morales-Ruiz; CHARA PANTAZI

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ON THE INTEGRABILITY OF POLYNOMIAL VECTOR FIELDS IN THE PLANE BY MEANS OF PICARD-VESSIOT THEORY

机译：皮卡维理论在平面上多项式矢量场的可积性

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摘要

We study the integrability of polynomial vector fields using Galois theory of linear differential equations when the associated foliations is reduced to a Riccati type foliation. In particular we obtain integrability results for some families of quadratic vector fields, Liénard equations and equations related with special functions such as Hypergeometric and Heun ones. The Poincaré problem for some families is also approached.

机译：当关联的叶面化为Riccati类型的叶面时，我们使用Galois线性微分方程理论研究多项式向量场的可积性。特别是，我们获得了一些二次矢量场族，Liénard方程以及与特殊函数有关的方程（例如Hypergeometric和Heun方程）的可积性结果。还解决了一些家庭的庞加莱问题。

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来源
《Discrete and continuous dynamical systems》 |2015年第5期|1767-1800|共34页
作者
PRIMITIVO B. ACOSTA-HUMÁNEZ; J. TOMÁS LÁZARO; Juan J. Morales-Ruiz; CHARA PANTAZI;
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作者单位

Department of Mathematics Universidad del Atlántico and Intelectual.Co Barranquilla, Colombia;

Departament de Matemàtica Aplicada I Universitat Politècnica de Catalunya Barcelona, Spain;

Department of Applied Mathematics Technical University of Madrid Madrid, Spain;

Departament de Matemàtica Aplicada I Universitat Politècnica de Catalunya Barcelona, Spain;

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正文语种 eng
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关键词
Differential Galois theory; Darboux theory of integrability; Poincaré problem; rational first integral; integrating factor; Riccati equation; Liénard equation; Liouvillian solution;

机译：微分伽罗瓦理论;达布积分理论;庞加莱问题;有理一阶积分;积分因子;Riccati方程;Liénard方程;Liouvillian解;

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专利

1. Darboux theory of integrability for polynomial vector fields on S~n [J] . Jaume Llibre, Adrian C. Murza Dynamical Systems . 2018,第4期

机译：S〜n上的多项式向量场的Darboux可积性理论
2. Differential Galois theory and non-integrability of planar polynomial vector fields [J] . Acosta-Humanez Primitivo B., Tomas Lazaro J., Morales-Ruiz Juanj., Journal of Differential Equations . 2018,第12期

机译：差分伽罗瓦理论与平面多项式矢量场的不可替代性
3. Integrability of plane fields defined by 2-vector fields [J] . Mikami K, Mizutani T International journal of mathematics . 2005,第2期

机译：由2向量场定义的平面场的可积性
4. YANG-MILLS THEORIES USING ONLY EXTENDED FIELDS (VECTORIAL AND SCALAR) AS GAUGE FIELDS [C] . MAX CHAVES Marcel Grossmann Meeting on General Relativity . 2005

机译：阳厂仅使用延伸的田地（矢量和标量）作为规格田地
5. A Differential Algebra Approach to Commuting Polynomial Vector Fields and to Parameter Identifiability in ODE Models [D] . Thompson, Peter A. 2019

机译：ODE模型中多项式矢量场交换和参数可识别性的微分代数方法
6. Optical Diffraction in Close Proximity to Plane Apertures. IV. Test of a Pseudo-Vectorial Theory [O] . Klaus D. Mielenz 2006

机译：接近平面孔径的光学衍射。 IV。伪矢量理论的检验
7. On the integrability of polynomial fields in the plane by means of Picard-Vessiot theory [O] . Acosta-Humánez, Primitivo B., Lázaro-Ochoa, J. Tomás, Morales-Ruiz, Juan J., 2012

机译：关于平面多项式场的可积性 picard-Vessiot理论
8. Multiplicities of Zeroes of Polynomials on Trajectories of Polynomial VectorFields and Bounds on Degree of Nonholonomy [R] . Gabrielov, A. 1995

机译：多项式零点的多重性对多项式向量场的轨迹和非自治度的界限

ON THE INTEGRABILITY OF POLYNOMIAL VECTOR FIELDS IN THE PLANE BY MEANS OF PICARD-VESSIOT THEORY

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