The implicit-explicit (IMEX) BDF2 method with variable step-sizes, due to the non-smoothness of the initial data, is developed for solving parabolic partial integro-differential equation (PIDE), which describes the jump-diffusion option pricing model in finance. It is shown that the variable step-sizes IMEX BDF2 method is stable for abstract PIDE under suitable time step restrictions. Based on the time regularity analysis of abstract PIDE, the consistency error and the global error bounds for the variable step-sizes IMEX BDF2 method are provided. After time semi-discretization, spatial differential operators are treated by using finite difference methods and the jump integral is computed using the composite trapezoidal rule. Numerical results illustrate the effectiveness of the proposed method for European and American options under jump-diffusion models.

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