[1] P. Kloeden, E. Platen, Numerical solution of stochastic differential equations, Springer-Verlag, Berlin, 1999.
[2] K. Maleknejad, M. Khodabin, M. Rostami,
Numerical solution of stochastic Volterra integral equations by a stochastic operational matrix based on block pulse functions, Mathematical and Computer Modelling,55 (2012) 791--800.
[3] M. Khodabin, K. Maleknejad, F. Hosseini Shekarabi, Application of triangular functions to numerical solution of stochastic Volterra integral equations, International Journal of Applied Mathematics, 43 (2013) 1--9.
[4] F. Mirzaee, A. Hamzeh, A computational method for solving nonlinear stochastic Volterra integral equations, Journal of Computational and Applied Mathematics, 306 (2016) 166--178.
[5] E. Platen, N. Bruti-Liberati, Numerical solution of stochastic differential equations with jumps in finance, Springer, 2010.
[6] Y. Shen, Q. Meng, P. Shi, Maximum principle for mean-field jump-diffusion stochastic delay differential equations and it's application to finance,
Automatica, 50 (2014) 1565--1579.
[7] S. Salmi, J. Toivanen, An iterative method for pricing American options under jump-diffusion models, Applied Numerical Mathematics, 61 (2011) 821--831.
[8] M. P. Laurini, J. F. Caldeira, A macro-finance term structure model with multivariate stochastic volatility, International Review of Economics & Finance, (44)(2016) 68--90.
[9] N. Tien Dung, A stochastic Ginzburg-Landau equation with impulsive effects, Physica A 392 (2013) 1962--1971.
[10] B. Sousedi ́k, H. C. Elman, Stochastic Galerkin methods for the steady-state Navier-Stokes equations, Journal of Computational Physics, 316 (2016) 435--452.
[11] M. H. Heydari, M. R. Hooshmandasl, C. Cattani, F. M. Maalek Ghaini, An efficient computational method for solving nonlinear stochastic Ito-integral equations: Application for stochastic problems in physics, Journal of Computational Physics, 283 (2015) 148--168.
[12] S. Jin, R. Shu, A stochastic asymptotic-preserving scheme for a Kinetic-fluid model for disperse two-phase flows with uncertainty, Journal of Computational Physics, 335 (2017) 905--924.
[13] A. Oroji, M. Omar, S. Yarahmadian, An Ito stochastic differential equations model for the dynamics of the MCF-7 breast cancer cell line treated by radiotherapy, Journal of Theoretical Biology, 407 (2016) 128--137.
[14] M. Khodabin, K. Maleknejad, M. Rostami, M. Nouri, Interpolation solution in generalized stochastic exponential population growth model,
Applied Mathematics Modelling, 36 (2012) 1023--1033.
[15] M. Khodabin, K. Maleknejad, M. Rostami, M. Nouri, Numerical approach for solving stochastic Volterra-Fredholm integral equations by stochastic operational matrix, Computers & Mathematics with Applications, 64 (2012) 1903--1913.
[16] M. Khodabin, K. Maleknejad, M. Rostami,
A numerical method for solving m-dimensional stochastic Ito-Volterra integral equations by stochastic operational matrix, Computers & Mathematics with Applications,. 63 (2012) 133--143.
[17] M. H. Heydari, M. R. Hooshmandasl, F. M. Maalek Ghaini, C. Cattani, A computational method for solving stochastic Ito-Volterra integral equations based on stochastic operational matrix for generalized hat basis functions, Journal of Computational Physics, 270 (2014) 402--415.
[18] K. Maleknejad, M. Tavassoli Kajani, Solving second kind integral equations by Galerkin methods with hybrid Legendre and block pulse functions, Applied Mathematics and Computation, 145 (2003) 623--629.
[19] K. Maleknejad, Y. Mahmoudi, Numerical solution of linear Fredholm integral equation by using hybrid Taylor and block pulse functions, Applied Mathematics and Computation, 149 (2004) 799--806.
[20] F. Mohammadi, A wavelet-based computational method for solving stochastic Ito-Volterra integral equations,Journal of Computational Physics, 298 (2015) 254--265.
[21] F. Mohammadi, Numerical solution of stochastic Ito-Volterra integral equations using Haar wavelets, Numerical Mathematics: Theory, Methods and Applications, 9 (2016) 416--431.
[22] C. Cattani,Shannon wavelets for the solution of integro-differential equations, Mathematical Poblems in Engineering, (2010) 1--22.
[23] F. Mirzaee, E. Hadadiyan, Approximation solution of nonlinear Stratonovich Volterra integral equations by applying modification of hat functions, Journal of Computational and Applied Mathematics, 302 (2016) 272--284.
[24] K. E. Atkinson, The numerical solution of integral equations of the second kind, Cambridge University Press, Cambridge, 1997.
[25] F. Mirzaee, A. Hamzeh, A Computational method for solving nonlinear stochastic Volterra integral equations, Journal of Computational and Applied Mathematics, 306 (2016) 166--178.
[26] F. Mirzaee, E. Hadadiyan, Numerical solution of Volterra-Fredholm integral equations via modification of hat functions, Applied Mathematics and Computation, 280 (2016) 110--123.
[27] D. J. Higham, An algorithmic introduction to numerical simulation of stochastic differential equations, Siam Review, 43 (2001) 525--546.