a high order numerical method for ito stochastic volterra integral equations

The main purpose of this paper is to propose a high order numerical method based on the finite difference methods for solving nonlinear itô stochastic volterra integral equations (svies) of the second kind. to develop the method, a fourth-order implicit finite difference method and the explicit milstein method are implemented for the discretization of non-stochastic and stochastic integral parts, respectively. to solve the original svies, the proposed method has the deterministic fourth-order and strong stochastic first-order accuracy. the convergence analysis of the proposed method is proved. the finite difference method under consideration requires solving a 2×2 system of equations at each step for one-dimensional svie. therefore, the proposed method is very simple to implement and does not require a lot of computational cost. some numerical examples are prepared to indicate the verity and efficiency of the new method. moreover, the comparative numerical results show that this method is more accurate than those existing methods given in the literature.