References
- Agrawal , R. P. 1968 . Boundary Value Problems for High Order Differential Equations , Singapore : World Scientific .
- Bellman , R. E. and Casti , J. 1971 . Differential quadrature and long term integration . J. Math. Anal. Appl. , 34 : 235 – 238 .
- Çaglar , H. N. , Çaglar , S. H. and Twizell , E. H. 1999 . The numerical solution of fifth-order boundary value problems with sixth-degree B-spline function . Appl. Math. Lett. , 12 : 25 – 30 .
- Davies , A. R. , Karageorghis , A. and Phillips , T. N . 1988 . Spectral Galerkin methods for primary two-point boundary-value problem in medelling viscoelastic flows . Int. J. Numer. Methods Eng. , 26 : 647 – 662 .
- El-Gamel , M. 2007 . Sinc and the numerical solution of fifth-order boundary value problems . Appl. Math. Comput. , 187 : 1417 – 1433 .
- El-Gamel , M. and Zayed , A. I. 2004 . Sinc-Galerkin method for solving nonlinear boundary-value problems . Comput. Math. Appl. , 48 ( 9 ) : 1285 – 1298 .
- Karageorghis , A. , Phillips , T. N. and Davies , A. R. 1988 . Spectral collocation methods for the primary two-point boundary-value in modelling viscoelastic flows . Int. J. Numer. Methods Eng. , 26 : 805 – 813 .
- Khan , M. S. 1994 . Finite-difference solution of fifth-order boundary-values problems , Ph.D thesis, Brunel University
- Khan , M. A. , Siraj-ul-Islam , Tirmizi , S. I.A. , Twizell , E. H. and Asharaf , S. 2006 . A class of methods based on non-polynomial sextic spline functions for the solution of special fifth-order boundary-value problems . J. Math. Anal. Appl. , 321 : 651 – 660 .
- Lamnii , A. , Mraoui , H. , Sbibih , D. and Tijini , A. 2008 . Sextic spline solution of fifth-order boundary value problems . Math. Comput. Simulation , 85 : 1673 – 1684 .
- Schumeker , L. L. 1981 . “ Spline Functions: Basic Theory ” . New York : John Wiley and Sons .
- Wazwaz , A. M. 2001 . The numerical solution of fifth-order boundary-value problems by domain decomposition method . J. Comput. Appl. Math. , 136 : 259 – 270 .