论文信息 - Sextic spline collocation methods for nonlinear fifth-order boundary value problems

Sextic spline collocation methods for nonlinear fifth-order boundary value problems

In this paper, two sextic-spline collocation methods are developed and analysed for approximating solutions of nonlinear fifth-order boundary-value problems. The first method uses a spline interpolant and the second one is based on a spline quasi-interpolant, which are constructed from sextic splines. They are both proved to be second-order convergent. Numerical results confirm the order of convergence predicted by the analysis. It has been observed that the methods developed in this paper are better than the others given in the literature.

[1] Timothy Nigel Phillips,et al. Spectral collocation methods for the primary two-point boundary value problem in modelling viscoelastic flows , 1988 .

[2] Edward H. Twizell,et al. A class of methods based on non-polynomial sextic spline functions for the solution of a special fifth-order boundary-value problems , 2006 .

[3] Mohamed El-Gamel,et al. Sinc and the numerical solution of fifth-order boundary value problems , 2007, Appl. Math. Comput..

[4] R. Bellman,et al. DIFFERENTIAL QUADRATURE AND LONG-TERM INTEGRATION , 1971 .

[5] Edward H. Twizell,et al. THE NUMERICAL SOLUTION OF FIFTH-ORDER BOUNDARY-VALUE PROBLEMS WITH SIXTH-DEGREE B-SPLINE FUNCTIONS , 1999 .

[6] Timothy Nigel Phillips,et al. Spectral Galerkin methods for the primary two-point boundary value problem in modelling viscoelastic flows , 1988 .

[7] L. Schumaker. Spline Functions: Basic Theory , 1981 .

[8] A. Wazwaz. The numerical solution of fifth-order boundary value problemsby the decomposition method , 2001 .

[9] Mohamed El-Gamel,et al. Sinc-Galerkin method for solving nonlinear boundary-value problems , 2004 .

[10] Ahmed Tijini,et al. Sextic spline solution of fifth-order boundary value problems , 2008, Math. Comput. Simul..