English

The Euler-Maruyama approximations for the CEV model

Probability 2010-05-06 v1 Statistical Finance

Abstract

The CEV model is given by the stochastic differential equation Xt=X0+0tμXsds+0tσ(Xs+)pdWsX_t=X_0+\int_0^t\mu X_sds+\int_0^t\sigma (X^+_s)^pdW_s, 12p<1\frac{1}{2}\le p<1. It features a non-Lipschitz diffusion coefficient and gets absorbed at zero with a positive probability. We show the weak convergence of Euler-Maruyama approximations XtnX_t^n to the process XtX_t, 0tT0\le t\le T, in the Skorokhod metric. We give a new approximation by continuous processes which allows to relax some technical conditions in the proof of weak convergence in \cite{HZa} done in terms of discrete time martingale problem. We calculate ruin probabilities as an example of such approximation. We establish that the ruin probability evaluated by simulations is not guaranteed to converge to the theoretical one, because the point zero is a discontinuity point of the limiting distribution. To establish such convergence we use the Levy metric, and also confirm the convergence numerically. Although the result is given for the specific model, our method works in a more general case of non-Lipschitz diffusion with absorbtion.

Keywords

Cite

@article{arxiv.1005.0728,
  title  = {The Euler-Maruyama approximations for the CEV model},
  author = {V. Abramov and F. Klebaner and R. Liptser},
  journal= {arXiv preprint arXiv:1005.0728},
  year   = {2010}
}

Comments

13 pages

R2 v1 2026-06-21T15:18:47.614Z