Asymptotic error distributions for the Euler method for stochastic differential equations
成果类型:
Article
署名作者:
Jacod, J; Protter, P
署名单位:
Sorbonne Universite; Purdue University System; Purdue University
刊物名称:
ANNALS OF PROBABILITY
ISSN/ISSBN:
0091-1798
发表日期:
1998
页码:
267-307
关键词:
limit-theorems
STABILITY
摘要:
We are interested in the rate of convergence of the Euler scheme approximation of the solution to a stochastic differential equation driven by a general (possibly discontinuous) semimartingale, and by the asymptotic behavior of the associated normalized error. It is well known that for Ito's equations the rate is 1/root n;we provide a necessary and sufficient condition for this rate to be 1 root n when the driving semimartingale is a continuous martingale, or a continuous semimartingale under a mild additional assumption; we also prove that in these cases the normalized error processes converge in law. The rate can also differ fi om 1 root n: this is the case for instance if the driving process is deterministic, or if it is a Levy process without a Brownian component. It is again 1/root n when the driving process is Levy with a nonvanishing Brownian component, but then the normalized error processes converge in law in the finite-dimensional sense only, while the discretized normalized error processes converge in law in the Skorohod sense, and the limit is given an explicit form.