Article ID | Journal | Published Year | Pages | File Type |
---|---|---|---|---|
1140503 | Mathematics and Computers in Simulation | 2008 | 10 Pages |
Abstract
There are few techniques to numerically solve fifth-order boundary-value problems (BVPs). In this paper two sextic spline collocation methods are developed and analyzed. The first one uses spline interpolants and the second is based on spline quasi-interpolants. They are both proved to be second-order convergent. Numerical results verify the order of convergence predicted by the analysis.
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Authors
A. Lamnii, H. Mraoui, D. Sbibih, A. Tijini,