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

被引：0

作者：

A. A. Abramov

机构：

[1] Russian Academy of Sciences,Dorodnicyn Computing Center

来源：

Computational Mathematics and Mathematical Physics | 2011年 / 51卷

关键词：

Hamiltonian system of ordinary differential equations; nonlinear eigenvalue problem; eigenvalue;

D O I：

暂无

中图分类号：

学科分类号：

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.

引用

页码：35 / 39

页数：4

共 4 条

[1]

Abramov A. A.(2001)Calculation of Eigenvalues in a Nonlinear Spectral Problem for the Hamiltonian Systems of Ordinary Differential Equations Zh. Vychisl. Mat. Mat. Fiz. 41 29-38

[2]

Abramov A. A.(1961)Transfer of Boundary Conditions for Systems of Linear Ordinary Differential Equations: A Version of the Sweep Method Zh. Vychisl. Mat. Mat. Fiz. 1 542-545

[3]

Abramov A. A.(2006)Numerical Stability of a Method for Transferring Boundary Conditions Vychisl. Mat. Mat. Fiz. 46 401-406

[4]

Moszyński K.(1964)A Method of Solving the Boundary Value Problem for a System of Linear Ordinary Differential Equations Algoritmy 11 25-43

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