1Baker, C. T. H. and Buckwar, E., ‘Numerical analysis of explicit one-step methods for stochastic delay differential equations’, LMSJ. Comput. Math. 3 (2000)315–335.
2Buckwar, E., ‘Introduction to the numerical analysis of stochastic delay differential equations‘, J. Comput. Appl. Math 125 (2000)297–307.
3Fleury, G. and Bernard, P., ‘Convergence of numerical schemes for stochastic differential equations’, Monte Carlo Methods Appl. 7 (2001)35–4.
4Gyöngy, I., ‘A note on Euler's approximations’, Potential Anal. 8 (1998)205–216.
5Gyöngy, I. and Krylov, N., ‘‘Existence of strong solutions for Itô's stochastic equations via approximations’, Probab. Theory Related Fields 105 (1996)143–158.
6Hale, J.K. and Lunel, V. S. M., Introduction to functional differential equations (Springer, Berlin, 1993).
7Higham, D. J., Mao, X. and Stuart, A. M., ‘Strong convergence of numerical methods for nonlinear stochastic differential equations’, SIAM J. Numer. Anal. 40 (2002)1041–1063.
8Hu, Y., ‘Semi-implicit Euler-Maruyama scheme for stiff stochastic equations’, Stochastic analysis and related topics V: The Silvri Workshop, Progr. Probab. 38 (ed. Koerezlioglu, H., Birkhauser, Boston, MA, 1996) 183–302.
9Hu, Y., Mohammed, S. E. A. and Yan, F., ‘Numerical solution of stochastic differential systems with memory’, Preprint, Southern Illinois University, 2001.
10Kloeden, P. E. and Platen, E., Numerical solutions of stochastic differential equations (Springer, Berlin, 1992).
11Kolmanovskii, V. and Myshkis, A., Applied theory of fundamental differential equations (Kluwer Academic Publishers, Dordrecht, 1992).
12Küchler, U. and Platen, E., ‘Strong discrete time approximation of stochastic differential equations with time delay’, Math. Comput. Simulation 54 (2000)189–205.
13Mao, X., Approximate solutions for a class of stochastic evolution equations with variable delays—part II, Numerical Functional Analysis and Optimisation 15 (1994)65–76.
14Mao, X., Exponential stability of stochastic differential equations (Marcel Dekker, New York, 1994).
15Mao, X., Stochastic differential equations and applications (Horwood, England, 1997).
16Mao, X. and Sabanis, S., ‘Numerical solutions of stochastic differential delay equations under local Lipschitz condition’, J. Comput. Appl. Math. 151 (2003)215–227.
17Milstein, G.N., Numerical integration of stochastic differential equations (Kluwer Academic Publishers Group, Dordrecht, 1995).
18Platen, E., ‘An introduction to numerical methods for stochastic differential equations’, Acta Numerica 8 (1999)195–244.