References
- L.R. Abrahamson, A priori estimates for solutions of singular perturbations with a turning point, Studies in Applied Mathematics 56(1) (1977), pp. 51–69.
- A.R. Ansari, S.A. Bakr, and G.I. Shishkin, A parameter-robust finite difference method for singularly perturbed delay parabolic partial differential equations, J. Comput. Appl. Math. 205(1) (2007), pp. 552–566.
- A.E. Berger, H. De Han, and R.B. Kellogg, A priori estimates and analysis of a numerical method for a turning point problem, Math. Comput. 42(166) (1984), pp. 465–492.
- F. Black and M. Scholes, The pricing of options and corporate liabilities, Journal of Political Economy 81(3) (1973), pp. 637–654.
- C. Clavero, J.L. Gracia, and J.C. Jorge, High-order numerical methods for one-dimensional parabolic singularly perturbed problems with regular layers, Numerical Methods for Partial Differential Equations: An International Journal 21(1) (2005), pp. 149–169.
- R.K. Dunne, E. O'Riordan, and G.I. Shishkin, A fitted mesh method for a class of singularly perturbed parabolic problems with a boundary turning point, Computational Methods in Applied Mathematics 3(3) (2003), pp. 361–372.
- W. Eckhaus, Asymptotic Analysis of Singular Perturbations, Vol. 9, Elsevier, New York, 2011.
- P.A. Farrell, Sufficient conditions for the uniform convergence of a difference scheme for a singularly perturbed turning point problem, SIAM. J. Numer. Anal. 25(3) (1988), pp. 618–643.
- P. Farrell, A. Hegarty, J.M. Miller, E. O'Riordan, G.I. Shishkin, Robust Computational Techniques for Boundary Layers, CRC Press, New York, 2000.
- V. Gupta and M.K. Kadalbajoo, A layer adaptive b-spline collocation method for singularly perturbed one-dimensional parabolic problem with a boundary turning point, Numer. Methods. Partial. Differ. Equ. 27(5) (2011), pp. 1143–1164.
- V. Gupta, M.K. Kadalbajoo, and R.K. Dubey, A parameter-uniform higher order finite difference scheme for singularly perturbed time-dependent parabolic problem with two small parameters, Int. J. Comput. Math. 96(3) (2019), pp. 474–499.
- T.C. Hanks, Model relating heat-flow values near, and vertical velocities of mass transport beneath, oceanic rises, J. Geophys. Res. 76(2) (1971), pp. 537–544.
- C. Hirsch, Numerical Computation of Internal and External Flows: The Fundamentals of Computational Fluid Dynamics, Elsevier, Oxford, 2007.
- M. Jacob, Heat Transfer, Vol. 1, Wiley, New York, 1949.
- M.K. Kadalbajoo and V. Gupta, A brief survey on numerical methods for solving singularly perturbed problems, Appl. Math. Comput. 217(8) (2010), pp. 3641–3716.
- R.B. Kellogg and A. Tsan, Analysis of some difference approximations for a singular perturbation problem without turning points, Math. Comput. 32(144) (1978), pp. 1025–1039.
- O.A. Ladyzhenskaia, V.A. Solonnikov, N.N. Ural'tseva, Linear and Quasi-linear Equations of Parabolic Type, Vol. 23, American Mathematical Soc., Providence, RI, 1988.
- B.E. Launder, D.B. Spalding, Mathematical Models of Turbulence, Academic press, New York, 1972.
- T. Linß, Layer-adapted Meshes for Reaction-convection-diffusion Problems, Springer, Heidelberg, 2010.
- T. Linß and R. Vulanovic, Uniform methods for semilinear problems with an attractive boundary turning point, Novi Sad J. Math 31(2) (2001), pp. 99–114.
- J.J.H. Miller, E. O'Riordan, G.I. Shishkin, and L.P. Shishkina, Fitted mesh methods for problems with parabolic boundary layers, Math. Proc.-R. Ir. Acad. 98, Royal Irish Academy, 1998, pp. 173–190.
- J.J.H. Miller, E. O'Riordan, G.I. Shishkin, Fitted Numerical Methods for Singular Perturbation Problems: Error Estimates in the Maximum Norm for Linear Problems in One and Two Dimensions, World Scientific, Singapore, 2012.
- S.J. Polak, C. Den Heijer, W.H.A. Schilders, and P. Markowich, Semiconductor device modelling from the numerical point of view, Int. J. Numer. Methods. Eng. 24(4) (1987), pp. 763–838.
- E. Robert Jr. Singular Perturbation Methods for Ordinary Differential Equations, Vol. 89, Springer Science & Business Media, New York, 2012.
- H-G. Roos, M. Stynes, L. Tobiska, Robust Numerical Methods for Singularly Perturbed Differential Equations: Convection-diffusion-reaction and Flow Problems, Vol. 24, Springer, Berlin, 2008.
- H. Schlichting, Boundary-layer Theory, McGraw-Hill, New York, 1979.
- K.K. Sharma, P. Rai, and K.C. Patidar, A review on singularly perturbed differential equations with turning points and interior layers, Applied Mathematics & Computation 219 (2013), pp. 10575–10609.
- G.I. Shishkin, Grid approximations to singularly perturbed parabolic equations with turning points, Differential Equations 37(7) (2001), pp. 1037–1050.
- G.I. Shishkin, The richardson scheme for the singularly perturbed parabolic reaction-diffusion equation in the case of a discontinuous initial condition, Computational Mathematics and Mathematical Physics 49(8) (2009), pp. 1348–1368.
- G.I. Shishkin and L.P. Shishkina, A higher order richardson scheme for a singularly perturbed semilinear elliptic convection-diffusion equation, Computational Mathematics and Mathematical Physics 50(3) (2010), pp. 437–456.
- G.I. Shishkin and L.P. Shishkina, A richardson scheme of the decomposition method for solving singularly perturbed parabolic reaction-diffusion equation, Computational Mathematics and Mathematical Physics 50(12) (2010), pp. 2003–2022.
- M. Stynes and H-G. Roos, The midpoint upwind scheme, Appl. Numer. Math. 23(3) (1997), pp. 361–374.