Abstract
Some draining or coating fluid-flow problems and problems concerning the flow of thin films of viscous fluid with a free surface can be described by third-order ordinary differential equations (ODEs). In this paper, we solve the boundary value problems of such equations by sinc discretization and prove that the discrete solutions converge to the true solutions of the ODEs exponentially. The discrete solution is determined by a linear system with the coefficient matrix being a combination of Toeplitz and diagonal matrices. The system can be effectively solved by Krylov subspace iteration methods, such as GMRES, preconditioned by banded matrices. We demonstrate that the eigenvalues of the preconditioned matrix are uniformly bounded within a rectangle on the complex plane independent of the size of the linear system. Numerical examples are given to illustrate the effective performance of our method.
Original language | English |
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Pages (from-to) | 471-497 |
Number of pages | 27 |
Journal | Numerical Linear Algebra with Applications |
Volume | 18 |
Issue number | 3 |
Early online date | 13 Apr 2011 |
DOIs | |
Publication status | Published - May 2011 |
Externally published | Yes |
Funding
The National Basic Research Program; contract/grant number: 2005CB321702; Contract/grant sponsor: The China Outstanding Young Scientist Foundation; contract/grant number: 10525102; Contract/grant sponsor: The Hong Kong Research Grants Council Grant; contract/grant number: 400508; Contract/grant sponsor: CUHK DAG; contract/grant number: 2060257
Keywords
- Banded preconditioning
- Convergence analysis
- Krylov subspace methods
- Sinc-collocation discretization
- Sinc-Galerkin discretization
- Third-order ordinary differential equation