Explicit modified Euler approximations of the A\"it-Sahalia type model with Poisson jumps

Abstract

This paper focuses on mean-square approximations of a generalized A\"it-Sahalia interest rate model with Poisson jumps. The main challenge in the construction and analysis of time-discrete numerical schemes is caused by a drift that blows up at the origin, highly nonlinear drift and diffusion coefficients and positivity-preserving requirement. Due to the presence of the Poisson jumps, additional difficulties arise in recovering the exact order 1/2 of convergence for the time-stepping schemes. By incorporating implicitness in the term α-1x-1 and introducing the modifications functions fh and gh in the recursion, a novel explicit Euler-type scheme is proposed, which is easy to implement and preserves the positivity of the original model unconditionally, i.e., for any time step-size h>0. A mean-square convergence rate of order 1/2 is established for the proposed scheme in both the non-critical and general critical cases. Finally, numerical experiments are provided to confirm the theoretical findings.