Keywords:-

Keywords: Collocation method, B-splines, Singular differential equations, Neumann’s boundary conditions

Article Content:-

Abstract

A Recursive form B-spline basis function is used as basis in B-spline collocation method. The method is applied to solve second order singular differential equations with Neumann’s boundary conditions. Results of Numerical examples show the efficiency of the method. Stability of present method and accuracy of numerical solution is constantly improved by decreasing the nodal space.

References:-

References

Hughes, T.J.R., Cottrell, J.A. and Bazilevs, Y. ‘‘Isgeometric analysis: CAD, finite elements, NURBS,

exact geometry and mesh refinement’’, Comput.Methods Appl. Mech. Engg., 194(39–41), pp. 4135–

(2005).

David F.Rogers and J.Alan Adams, “Mathematical Elements for Computer Graphics”, 2nd ed., Tata

McGraw-Hill Edition, New Delh.C. de Boor and K. H¨ollig. B-splines from parallelepipeds. J. Analyse Math., 42:99– 15,

R.K. Pandey and Arvind K. Singh, On the convergence of a finite difference method for

a class of singular boundary value problems arising in physiology, J. Comput. Appl. Math 166 (2004)

-564.

Geng, F.Z. and Cui, M.G. (2007) Solving Singular Nonlinear Second-Order Periodic Boundary

Value Problems in the Reproducing Kernel Space. Applied Mathematics and Computation, 192, 389-

Li, Z.Y., Wang, Y.L., Tan, F.G., Wan, X.H. and Nie, T.F. (2012) The Solution of a Class of

Singularly Perturbed Two-Point Boundary Value Problems by the Iterative Reproducing Kernel

Method. Abstract and Applied Analysis, 1-7

Mohsen, A. and El-Gamel, M. (2008) On the Galerkin and Collocation Methods for Two Point

Boundary Value Problems Using Sinc Bases. Computers and Mathematics with Allications, 56, 930-

Abdalkaleg Hamad, M. Tadi, Miloje Radenkovic (2014) A Numerical Method for Singular

Boundary-Value Problems. Journal of Applied Mathematics and Physics, 2, 882-887.

S Joan Goh_, Ahmad Abd. Majid, Ahmad Izani Md. Ismail (2011) Extended cubic uniform B-spline

for a class of singular boundary value problems. Science Asia 37 (2011): 79–82

I. J. SCHOENBERG Contributions to the problem of approximation of equidistant data

by analytic functions, Quart. Appl. Math. 4 (1946), 45-99; 112-141.

H. B. CURRYA ND I. J. SCHOENBERG On Polya frequency functions IV: The fundamental spline

functions and their limits, J. Anal. Math. 17 (1966), 71-107.

CARL DE BOOR On Calculating with B-plines. JOURNALO F APPROXIMATION TH- EORY6,

SO-62 (1972)

Hikmet Caglar, Nazan Caglar, Khaled Elfaituri (2006). B-spline interpolation compared with finite

difference, finite element and finite volume methods which applied to two-point boundary value

problems. Applied Mathematics and Computation 175 (2006) 72–79

Downloads

Citation Tools

How to Cite
Reddy, Y., Reddy, C., & Murthy, M. (2014). Solutions to Singular Differential Equations with Neumann’s Boundary -Value Problems Using Recursive form of B-spline Based Collocation Method. International Journal Of Mathematics And Computer Research, 2(10), 712-722. Retrieved from https://ijmcr.in/index.php/ijmcr/article/view/180