This paper is aimed to combine the interior penalty method with the exterior penalty method to propose a new solution strategy for solving the fractional partial differential complementarity problems governing American option under a geometric Lévy process. The fractional partial differential complementarity problem is first reformulated as a fractional partial differential variational inequality problem by choosing the appropriate representation of the fractional derivative. A penalty equation is constructed by introducing a new penalty function term to approximate the variational inequality problem. The existence and convergence of the solution for the penalized problem are established. A finite difference scheme to numerically solving the resulted penalty equation is also designed. Finally, the new solution strategy is applied to pricing a call American option and a put American option respectively. Comparisons with the single interior penalty method and the exterior penalty method, the usefulness and effectiveness for this method are numerically illustrated.
Duan et al. (Fri,) studied this question.