CUBIC B-SPLINE COLLOCATION METHOD FOR COUPLED SYSTEM OF ORDINARY DIFFERENTIAL EQUATIONS WITH VARIOUS BOUNDARY CONDITIONS

CUBIC B-SPLINE COLLOCATION METHOD FOR COUPLED SYSTEM OF ORDINARY DIFFERENTIAL EQUATIONS WITH VARIOUS BOUNDARY CONDITIONS

K. Amlani, M. Kumar, A. Shukla

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Abstract

This paper is concerned with collocation approach using cubic B-spline to solve coupled system of boundary value problems with various boundary conditions. The collocation equations are methodically derived using cubic B splines, for problems with Dirichlet data and an iterative method with assured convergence is described to solve the resulting system of algebraic equations. Problems with Cauchy or mixed boundary con- dition have been converted into series of Dirichlet problems using the bisection method. Nonlinear problem is linearized using quasilinearization to be handled by our method. Fourth order equation is converted into a coupled second order equations and solved by the proposed method . Several illustrative examples are presented with their error norms and order of convergence.

Keywords

Collocation method, Cubic B-spline, Quasilinearization, Bisection method, Boundary Value Problem.