References
- Doolan , E. P. , Miller , J. J.H. and Schilders , W. H.A. 1980 . Uniform Numerical Methods for Problems with Initial and Boundary Layers , Dublin : Boole Press .
- Farrell , P. A. , Hegarty , A. F. , Miller , J. J.H. , O'Riordan , E. and Shishkin , G. I. 2000 . Robust Computational Techniques for Boundary Layers , Boca Raton, FL : Chapman & Hall–CRC .
- Nayfeh , A. H. 1993 . Introduction to Perturbation Techniques , New York : John Wiley .
- O'Malley , R. E. 1991 . Singular Perturbation Methods for Ordinary Differential Equations , New York : Springer-Verlag .
- Roos , H. G. , Stynes , M. and Tobiska , L. 1996 . Numerical Methods for Singularly Perturbed Differential Equations, Convection–Diffusion and Flow Problems , Berlin : Springer-Verlag .
- Farrell , P. A. , O'Riordan , E. and Shishkin , G. I. 2005 . A class of singularly perturbed semilinear differential equations with interior layers . Mathematics of Computation , 74 : 1759 – 1776 .
- Lin , B. T. and Stynes , M. 1999 . A hybrid difference scheme on a Shishkin mesh for linear convection–diffusion problems . Applied Numerical Mathematics , 31 : 255 – 270 .
- Savin , I. A. 1995 . On the rate of convergence, uniform with respect to a small parameter, of a difference scheme for an ordinary differential equation . Computational Mathematics and Mathematical Physics , 35 ( 11 ) : 1417 – 1422 .
- Sun , G. and Stynes , M. 1996 . A uniformly convergent method for a singularly perturbed semilinear reaction-diffusion problem with multiple solutions . Mathematics of Computation , 65 : 1085 – 1109 .
- Lin , B. T. 2003 . Layer-adapted meshes for convection–diffusion problems . Computer Methods in Applied Mechanics and Engineering , 192 : 1061 – 1105 .
- Amiraliyev , G. M. and Cakir , M. 2000 . A uniformly convergent difference scheme for a singularly perturbed problem with convective term and zeroth-order reduced equations . International Journal of Applied Mathematics , 2 : 1407 – 1419 .
- Il’in , A. M. 1969 . Differencing scheme for a differential equation with a small parameter affecting the highest derivative . Mathematical Notes of the Academy of Sciences of the USSR , 6 : 596 – 602 .
- Cziegis , R. 1988 . The numerical solution of singularly perturbed nonlocal problem (in Russian) . Lietuvas Matematica Rink , 28 : 144 – 152 .
- Cziegis , R. 1991 . The difference schemes for problems with nonlocal conditions . Informatica (Lietuva) , 2 : 155 – 170 .
- Gupta , C. P. and Trofimchuh , S. I. 1997 . A sharper condition for the solvability of a three-point second order boundary value problem . Journal of Mathematical Analysis and Applications , 205 : 586 – 597 .
- Liu , B. 2004 . Positive solutions of second order three-point boundary value problems with change of sign . Computers and Mathematics with Applications , 47 : 1351 – 1361 .
- Ma , R. 2004 . Positive solutions for nonhomogeneous m-point boundary value problems . Computers and Mathematics with Applications , 47 : 689 – 698 .
- Nahushev , A. M. 1985 . On nonlocal boundary value problems (in Russian) . Differential Equations, , 21 : 92 – 101 .
- Sapagovas , M. and Cziegis , R. 1987 . Numerical solution of nonlocal problems (in Russian) . Lietuvas Matematica Rink , 27 : 348 – 356 .
- Sapagovas , M. and Cziegis , R. 1987 . On some boundary value problems with nonlocal condition (in Russian) . Differential Equations , 23 : 1268 – 1274 .
- Qu , W. , Zhang , Z. X. and Wu , J. 2002 . Positive solutions to a second order three-point boundary value problem . Applied Mathematics and Mechanics (English Edition) , 23 : 584 – 866 .
- Xu , X. 2004 . Positive solutions for singular m-point boundary value problems with positive parameter . Journal of Mathematical Analysis and Applications , 291 : 352 – 367 .
- Amiraliyev , G. M. and Cakir , M. 2002 . Numerical solution of the singularly perturbed problem with nonlocal boundary condition . Applied Mathematics and Mechanics (English Edition) , 23 : 755 – 764 .
- Amiraliyev , G. M. 1988 . On the numerical solution of the system of Boussinesque with boundary layers (in Russian) . Modeling in Mechanics , 3 : 3 – 14 .
- Amiraliyev , G. M. and Duru , H. 2003 . A uniformly convergent difference method for the periodical boundary value problem . Computers and Mathematics with Applications , 46 : 695 – 503 .
- Farrell , P. A. and Hegarty , A. F. On the determination of the order of uniform convergence. In: . Proceedings of the 13th IMACS World Congress . pp. 501 – 502 .