论文信息 - The conditioning of linear boundary value problems

The conditioning of linear boundary value problems

Investigation is made into the sensitivity of solutions of linear boundary value problems to perturbations of the boundary condition. We derive a useful quantity to decide for well or ill conditioning. From this it is deduced which kind of requirements the boundary conditions should meet in order to have a well conditioned problem. It is shown that this quantity can fruitfully be used to explain why, e.g., the multiple shooting technique is stable (in contrast to the single shooting one) for certain well posed problems having solutions with different growth behavior. The results are sustained by a number of examples.

R. Mattheij

[1] J. H. Wilkinson. The algebraic eigenvalue problem , 1966 .

[2] S. D. Conte. The Numerical Solution of Linear Boundary Value Problems , 1966 .

[3] J. Falkenberg. A method for integration of unstable systems of ordinary differential equation subject to two-point boundary conditions , 1968 .

[4] M. R. Osborne. On shooting methods for boundary value problems , 1969 .

[5] A. Sluis. Condition numbers and equilibration of matrices , 1969 .

[6] R. Gunderson,et al. Conditioning of linear boundary value problems , 1972 .

[7] H. A. Watts,et al. Computational Solution of Linear Two-Point Boundary Value Problems via Orthonormalization , 1977 .

[8] Peter Deuflhard,et al. Nonlinear Equation Solvers in Boundary Value Problem Codes , 1978, Codes for Boundary-Value Problems in Ordinary Differential Equations.

[9] R.M.M. Mattheij,et al. Characterizations of dominant and dominated solutions of linear recursions , 1980 .

[10] Richard Weiss,et al. On the Boundary Value Problem for Systems of Ordinary Differential Equations with a Singularity of the Second Kind , 1980 .