An approximate maximum likelihood estimator of drift parameters in a multidimensional diffusion model
Statistics Theory
2023-07-19 v1 Statistics Theory
Abstract
For a fixed and , a -dimensional vector stochastic differential equation is studied over a time interval . Vector of drift parameters is unknown. The dependence in is in general nonlinear. We prove that the difference between approximate maximum likelihood estimator of the drift parameter obtained from discrete observations and maximum likelihood estimator obtained from continuous observations , when tends to zero, converges stably in law to the mixed normal random vector with covariance matrix that depends on and on path . The uniform ellipticity of diffusion matrix emerges as the main assumption on the diffusion coefficient function.
Cite
@article{arxiv.2307.09199,
title = {An approximate maximum likelihood estimator of drift parameters in a multidimensional diffusion model},
author = {Miljenko Huzak and Snježana Lubura Strunjak and Andreja Vlahek Štrok},
journal= {arXiv preprint arXiv:2307.09199},
year = {2023}
}
Comments
38 pages