Markov Jump Processes Approximating a Nonsymmetric Generalized Diffusion: numerics explained to probabilists

Abstract

Consider a non-symmetric generalized diffusion X(·) in d determined by the differential operator A()=-Σij ∂iaij()∂j +Σi bi()∂i. In this paper the diffusion process is approximated by Markov jump processes Xn(·), in homogeneous and isotropic grids Gn ⊂ d, which converge in distribution to the diffusion X(·). The generators of Xn(·) are constructed explicitly. Due to the homogeneity and isotropy of grids, the proposed method for d≥3 can be applied to processes for which the diffusion tensor \aij()\11dd fulfills an additional condition. The proposed construction offers a simple method for simulation of sample paths of non-symmetric generalized diffusion. Simulations are carried out in terms of jump processes Xn(·). For d=2 the construction can be easily implemented into a computer code.