Inverse Approach in Ordinary Differential Equations: Applications to Lagrangian and Hamiltonian Mechanics

Jaume Llibre; Rafael Ramirez; Natalia Sadovskaia

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Inverse Approach in Ordinary Differential Equations: Applications to Lagrangian and Hamiltonian Mechanics

机译：常微分方程的逆方法：在拉格朗日和哈密顿力学中的应用

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This paper is on the so called inverse problem of ordinary differential equations, i.e. the problem of determining the differential system satisfying a set of given properties. More precisely we characterize under very general assumptions the ordinary differential equations in R~N which have a given set of either M partial integrals, or M ＜ N first integral, or M ＜ N partial and first integrals. Moreover, for such systems we determine the necessary and sufficient conditions for the existence of N - 1 independent first integrals. We give two relevant applications of the solutions of these inverse problem to constrained Lagrangian and Hamiltonian systems respectively. Additionally we provide the general solution of the inverse problem in dynamics.

机译：本文是关于常微分方程的所谓逆问题，即确定满足一组给定性质的微分系统的问题。更准确地说，我们在非常一般的假设下表征R〜N中的常微分方程，这些方程具有给定的一组M个部分积分，或者M ＜N个第一积分，或者M ＜N个部分和第一积分。而且，对于这样的系统，我们确定存在N-1个独立的第一积分的必要和充分条件。我们分别将这些反问题的解的两个相关应用应用于约束拉格朗日系统和哈密顿系统。另外，我们提供了动力学反问题的一般解决方案。

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来源
《Journal of dynamics and differential equations》 |2014年第3期|529-581|共53页
作者
Jaume Llibre; Rafael Ramirez; Natalia Sadovskaia;
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作者单位

Departament de Matematiques, Universitat Autonoma de Barcelona, 08193, Bellaterra, Barcelona, Catalonia, Spain;

Departament d'Enginyeria Informatica i Matematiques, Universitat Rovira i Virgili, Avinguda dels Paiesos Catalans 26, 43007 Tarragona, Catalonia, Spain;

Departament de Matematica Aplicada Ⅱ, Universitat Politecnica de Catalunya, C. Pau Gargallo 5, 08028 Barcelona, Catalonia, Spain;

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正文语种 eng
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关键词
Algebraic limit circles; Polynomial planar differential system; Polynomial vector fields; Invariant circles; Invariant algebraic circles; Darboux integrability; 16th Hilbert's problem;

机译：代数极限圆;多项式平面微分系统;多项式向量场;不变的圆;不变代数圈;Darboux可整合性;希尔伯特第十六题;

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专利

1. Lagrangian mechanics without ordinary differential equations [J] . Patrick GW Reports on Mathematical Physics . 2006,第3期

机译：没有常微分方程的拉格朗日力学
2. Geometric calculus for second-order differential equations and generalizations of the inverse problem of Lagrangian mechanics [J] . W. Sarlet International journal of non-linear mechanics . 2012,第10期

机译：二阶微分方程的几何演算和拉格朗日力学反问题的推广
3. Numerical Methods for the Eigenvalue Determination of Second-Order Ordinary Differential Equations and Their Applications to Quantum Mechanics [J] . 石川英明 Journal of computer chemistry . 2007,第3期

机译：二阶常微分方程特征值确定的数值方法及其在量子力学中的应用
4. Reduction of Linear Hamiltonian Systems of Ordinary Differential Equations [C] . I. V. Kireev International Conference for Promoting the Application of Mathematics in Technical and Natural Sciences . 2015

机译：普通微分方程线性哈密顿系统的减少
5. Inverse Spectral Problem for Systems of Ordinary Differential Equations利用統計を見る [D] . Yamamoto Masahiro 1988

机译：常微分方程系统的反谱问题查看用法统计
6. Optimal Adaptive Designs with Inverse Ordinary Differential Equations [O] . Eugene Demidenko -1

机译：逆常微分方程的最优自适应设计
7. Inverse Approach in Ordinary Differential Equations: Applications to Lagrangian and Hamiltonian Mechanics [O] . Llibre Jaume 2014

机译：常微分方程的逆方法：在拉格朗日和哈密顿力学中的应用
8. CONSTRAINTS IN QUANTUM MECHANICS VIA LAGRANGIANS, HAMILTONIANS, AND CANONICAL EQUATIONS OF MOTION [R] . P. Amiot, J. J. Griffin 1976

机译：通过拉格朗日，哈密顿和运动的正则方程在量子力学中的约束

Inverse Approach in Ordinary Differential Equations: Applications to Lagrangian and Hamiltonian Mechanics

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