Fitted mesh B-spline collocation method for singularly perturbed differential-difference equations with small delay

Abstract This paper deals with the singularly perturbed boundary value problem for a linear second order differential–difference equation of the convection–diffusion type with small delay parameter δ of o ( e ) whose solution has a boundary layer. The fitted mesh technique is employed to generate a piecewise-uniform mesh, condensed in the neighborhood of the boundary layers. B-spline collocation method is used with fitted mesh. Parameter-uniform convergence analysis of the method is discussed. The method is shown to have almost second order parameter-uniform convergence. The effect of small delay δ on boundary layer has also been discussed. Several examples are considered to demonstrate the performance of the proposed scheme and how the size of the delay argument and the coefficient of the delay term affects the layer behavior of the solution.

[1]  P. M. Prenter Splines and variational methods , 1975 .

[2]  M Barrett,et al.  HEAT WAVES , 2019, The Year of the Femme.

[3]  Daniel De Kee,et al.  Mass transport through swelling membranes , 2005 .

[4]  J. J. Miller,et al.  Fitted Numerical Methods for Singular Perturbation Problems , 1996 .

[5]  Michael Bestehorn,et al.  Formation and propagation of localized states in extended systems , 2004 .

[6]  Wil H. A. Schilders,et al.  Uniform Numerical Methods for Problems with Initial and Boundary Layers , 1980 .

[7]  JohnM . Miller,et al.  Robust Computational Techniques for Boundary Layers , 2000 .

[8]  Lutz Tobiska,et al.  Numerical Methods for Singularly Perturbed Differential Equations , 1996 .

[9]  M. Stynes,et al.  Numerical methods for singularly perturbed differential equations : convection-diffusion and flow problems , 1996 .

[10]  M. K. Kadalbajoo,et al.  epsilon-Uniformly convergent fitted mesh finite difference methods for general singular perturbation problems , 2006, Appl. Math. Comput..

[11]  Xiaofeng Liao,et al.  Hopf and resonant codimension two bifurcation in van der Pol equation with two time delays , 2005 .

[12]  Mohan K. Kadalbajoo,et al.  Fitted mesh B-spline collocation method for solving self-adjoint singularly perturbed boundary value problems , 2005, Appl. Math. Comput..

[13]  C. A. Hall,et al.  On error bounds for spline interpolation , 1968 .

[14]  J. Varah A lower bound for the smallest singular value of a matrix , 1975 .

[15]  L. Segel,et al.  Introduction to Singular Perturbations. By R. E. O'MALLEY, JR. Academic Press, 1974. $ 16.50. , 1975, Journal of Fluid Mechanics.

[16]  Eugene C. Gartland,et al.  Graded-mesh difference schemes for singularly perturbed two-point boundary value problems , 1988 .

[17]  Singh M. Nayan,et al.  On Fixed Points , 1981 .

[18]  N. S. Bakhvalov The optimization of methods of solving boundary value problems with a boundary layer , 1969 .

[19]  Luigi Preziosi,et al.  Addendum to the paper , 1990 .

[20]  H. M. Gibbs,et al.  Bifurcation gap in a hybrid optically bistable system , 1982 .

[21]  Eugene O'Riordan,et al.  A class of singularly perturbed semilinear differential equations with interior layers , 2005, Math. Comput..

[22]  L. Glass,et al.  Oscillation and chaos in physiological control systems. , 1977, Science.

[23]  Luigi Preziosi,et al.  Addendum to the paper "Heat waves" [Rev. Mod. Phys. 61, 41 (1989)] , 1990 .

[24]  Eugene O'Riordan,et al.  On piecewise-uniform meshes for upwind- and central-difference operators for solving singularly perturbed problems , 1995 .

[25]  M. K. Kadalbajoo,et al.  Numerical analysis of singularly perturbed delay differential equations with layer behavior , 2004, Appl. Math. Comput..

[26]  T. A. Burton,et al.  Fixed points, stability, and exact linearization , 2005 .

[27]  Relja Vulanović Non‐Equidistant Generalizations of the Gushchin‐Shchennikov Scheme , 1987 .