Studia Universitatis Babeş-Bolyai Mathematica

In this communication, we have studied an ecient numerical ap-
proach based on uniform mesh for the numerical solutions of fourth order
singular perturbation boundary value problems. Such type of problems arises
in various elds of science and engineering, such as electrical network and vi-
bration problems with large Peclet numbers, Navier-Stokes ows with large
Reynolds numbers in the theory of hydrodynamics stability, reaction-diusion
process, quantum mechanics and optimal control theory etc. In the present
study, a quintic B-spline method has been discussed for the approximate solu-
tion of the fourth order singular perturbation boundary value problems. The
convergence analysis is also carried out and the method is shown to have con-
vergence of second order. The performance of present method is shown through
some numerical tests. The numerical results are compared with other existing
method available in the literature.

A. E. Berger, H. Han and R. B. Kellogg, A priori estimates and analysis of a numerical method for a turning point problem, Mathematics of Computation, 42, 465-492 (1984).

A. Khan, I. Khan and T. Aziz, Sextic spline solution of a singularly perturbed boundary value problems, Applied Mathematics and computation, 181, 432-439 (2006).

A. R. Sarakhsi, S. Ashra, M. Jahanshahi and M. Sarakhsi, Investigation of boundary layers in some singular perturbation problems including fourth order ordinary dierential equations, World Applied Sciences Journal, 22, 1695-1701 (2013).

D. J. Fyfe, The use of the cubic spline in the solution of two point boundary value problems, Computing Journal, 12, 188-192 (1969).

E. P. Doolan, J. J. H. Miller and W. H. A. Schildres, Uniform numerical method for problems with initial and boundary layers, Dublin, Boole Press, (1980).

F. A. Howes, The asymptotic solution of a class of third-order boundary value problem arising in the theory of thin film flow, SIAM Journal of Applied Mathematics, 43, 993-1004 (1983).

H. G. Roos, M. Stynes and L. Tobiska, Numerical method for singularly perturbed differential equation convection-diusion and flow problems, Springer, (2006).

H. K. Mishra and S. Saini, Fourth order singularly perturbed boundary value problems via initial value techniques, Applied Mathematical Sciences, 8, 619-632 (2014).

J. C. Roja and A. Tamilselvan, Shooting method for singularly perturbed fourth-order ordinary dierential equations of reaction-diusion type, International Journal of Computational Methods, http://dx.doi.org/10.1142/S0219876213500412, Vol. 10, 1350041 (21

pages), (2013).

J. J. H. Miller, E. O'Riordan and G. I. Shishkin, Fitted numerical methods for singularly perturbed problems. Error estimates in the maximum norm for linear problems in one and two dimensions, Singapore: World Scientic Publishing Co. Pvt. Ltd., (2012).

K. K. Sharma, P. Rai and K. C. Patidar, A review on singularly perturbed dierential equations with turning points and interior layers, Applied Mathematics and Computation, 219, 10575-10609 (2013).

M. K. Kadalbajoo and K. C. Patidar, A survey of numerical techniques for solving singularly perturbed ordinary dierential equations, Applied Mathematics and Computations, 130, 457-510 (2002).

M. K. Kadalbajoo, A. S. Yadaw and D. Kumar, Comparative study of singularly perturbed two-point BVPs via: Fitted-mesh nite dierence method, B-spline collocation method and finite element method, Applied Mathematics and Computation, 204, 713-725 (2008).

M. Kumar, P. Singh and H. K. Mishra, A recent survey on computational techniques for solving singularly perturbed boundary value problems, International Journal of Computer Mathematics, 84, 1439-1463 (2007).

N. Geetha and A. Tamilselvan, Parameter uniform numerical method for fourth order singularly perturbed turning point problems exhibiting boundary layers, Ain Shams Engineering Journal, http://dx.doi.org/10.1016/j.asej.2016.04.018, (2016).

N. Geetha, A. Tamilselvan and V. Subburayan, Parameter uniform numerical method for third order singularly perturbed turning point problems exhibiting boundary layers, International Journal of Applied and Computational Mathematics, 2, 349-364 (2016).

P. A. Farrell, A. F. Hagarty, J. J. H. Miller, E. O'Riordan and G. I. Shishkin, Robust computational techniques for boundary layers, Boca Raton, Chapman and Hall/CRC Press, (2000).

P. Rai and K. K. Sharma, Numerical analysis of singularly perturbed delay dierential turning point problem, Applied Mathematics and Computation,218, 3486-3498 (2011).

P. Rai and K. K. Sharma, Numerical study of singularly perturbed dierential dierence equation arising in the modeling of neuronal variability, Computers & Mathematics with Applications, 63, 118-132, (2012).

R. E. Bellman and R. E. Kalaba, Quasilinearization and Nonlinear Boundary Value Problems, American Elsevier, New York, (1965).

R. E. O'Malley, Introduction to singular perturbations, New York, Academic Press, (1974).

R. K. Lodhi and H. K. Mishra, Computational approach for fourth-order self-adjoint singularly perturbed boundary value problems via Non-polynomial quintic spline, Iranian Journal of Science and Technology, Transactions A: Science, DOI 10.1007/s40995-016-0116-6, 2016.

R. K. Lodhi and H. K. Mishra, Solution of a class of fourth order singular singularly perturbed boundary value problems by quintic B-spline method, Journal of the Ni12 Ragerian Mathematical Society, 35, 257{265 (2016).

S. Chen and Y. Wang, A rational spectral collocation method for third-order singularly perturbed problems, Journal of Computational and applied Mathematics, 307, 93-105 (2016).

S. Pandit and M. Kumar, Haar wavelet approach for numerical solution of two parameters singularly perturbed boundary value problems, Applied Mathematics & Information Sciences, 6, 2965{2974 (2014).

S. Valarmathi and N. Ramanujam, A computational method for solving third order singularly perturbed ordinary dierential equations, Applied Mathematics and Computation, 129, 345-373 (2002).

T. R. Lucas, Error bounds for interpolating cubic splines under various end conditions, SIAM Journal Numerical Analysis, 11, 569{584 (1974).

V. Shanthi and N. Ramanujam, A boundary value technique for boundary value problems for singularly perturbed fourth-order ordinary dierential equations, Computers and Mathematics with Applications, 47, 1673{1688 (2004).

Y. Zhang, D. S. Naidu, C Cai and Y. Zou, Singular perturbations and time scales in control theories and applications: An overview 2002-2012, International Journal of Information and Systems Sciences, 9, 1-35 (2014).