A modification of one method for solving nonlinear self-adjoint eigenvalue problems for Hamiltonian systems of ordinary differential equations

Abramov A.A.

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A modification of one method for solving nonlinear self-adjoint eigenvalue problems for Hamiltonian systems of ordinary differential equations

机译：一种求解常微分方程哈密顿系统非线性自伴特征值问题的方法的改进

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摘要

A modification of the method proposed earlier by the author for solving nonlinear self-adjoint eigenvalue problems for linear Hamiltonian systems of ordinary differential equations is examined. The basic assumption is that the initial data (that is, the system matrix and the matrices specifying the boundary conditions) are monotone functions of the spectral parameter.

机译：研究了作者较早提出的方法的修改，该方法用于求解常微分方程线性哈密顿系统的非线性自伴特征值问题。基本假设是，初始数据（即系统矩阵和指定边界条件的矩阵）是光谱参数的单调函数。

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《Computational mathematics and mathematical physics》 |2011年第1期|共5页
作者
Abramov A.A.;
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正文语种 eng
中图分类计算数学;
关键词
eigenvalue; Hamiltonian system of ordinary differential equations; nonlinear eigenvalue problem;

机译：特征值;常微分方程的哈密顿系统;非线性特征值问题;

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专利

1. A modification of one method for solving nonlinear self-adjoint eigenvalue problems for Hamiltonian systems of ordinary differential equations [J] . Abramov A.A. Computational mathematics and mathematical physics . 2011,第1期

机译：一种求解常微分方程哈密顿系统非线性自伴特征值问题的方法的改进
2. On the Self-Adjoint Nonlinear Eigenvalue Problem for Hamiltonian Systems of Ordinary Differential Equations with Singularities [J] . A. A. Abramov, V. I. Ulyanova, L. F. Yukhno Computational mathematics and mathematical physics . 2008,第7期

机译：具有奇异性的常微分方程的哈密顿系统的自伴非线性特征值问题
3. Modification of a method for solving the multiparameter eigenvalue problem for systems of loosely coupled ordinary differential equations [J] . Kalinin E.D. Computational mathematics and mathematical physics . 2013,第7期

机译：松散耦合常微分方程组多参数特征值问题求解方法的改进
4. Bernstein Polynomials for Solving Nonlinear Stiff System of Ordinary Differential Equations [C] . Mohammed ALshbool, Ishak Hashim UKM FST Postgraduate Colloquium . 2015

机译：伯尼斯坦求解常微分方程非线性刚性系统的多项式
5. Peridynamics for Solving Linear/Nonlinear Ordinary and Partial Differential Equations [D] . Dorduncu, Mehmet 2018

机译：解线性/非线性常微分方程和偏微分方程的周动力学
6. Contribution to Speeding-Up the Solving of Nonlinear Ordinary Differential Equations on Parallel/Multi-Core Platforms for Sensing Systems [O] . Vahid Tavakkoli, Kabeh Mohsenzadegan, Jean Chamberlain Chedjou, 2020

机译：用于加速对照对传感系统并行/多核平台的非线性常微分方程的贡献
7. A Self-Adjoint Coupled System of Nonlinear Ordinary Differential Equations with Nonlocal Multi-Point Boundary Conditions on an Arbitrary Domain [O] . Hari Mohan Srivastava, Sotiris K. Ntouyas, Mona Alsulami, 2021

机译：在任意域上具有非识别多点边界条件的非线性常微分方程的自伴随耦合系统

A modification of one method for solving nonlinear self-adjoint eigenvalue problems for Hamiltonian systems of ordinary differential equations

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