Convergence of the class of methods for solutions of certain sixth-order boundary value problems

Abstract

The Class of various order numerical methods based on non-polynomial spline have been developed for the solution of linear and non-linear
sixth-order boundary value problems. We developed non-polynomial spline which contains a parameter $\rho$, act as the frequency of the trigonometric part of the spline function, when such parameter tends to zero the dened spline reduce into the septic polynomial spline, the consistency relation of non-polynomial spline derived in such a way that, to be fitted to approximate the solution of the given sixth-order boundary value problems. Boundary formulas are developed to associate with presented spline methods. Truncation errors are given, we developed the class of second, fourth, sixth and eight order methods. Convergence analysis has been proved. The obtained methods have been tested on nine examples, to illustrate practical usefulness of our approach. The results of our higher eight order method compare with the existing methods so far.

Keywords

• Sixth-order boundary value problem,Non-polynomial spline,Bound- ary formulae,Convergence analysis

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