Asymptotic likelihood theory for diffusion processes

B. M. Brown; J. I. Hewitt

doi:10.2307/3212436

Abstract

We investigate the large-sample behaviour of maximum likelihood estimates (MLE's) of the parameters of a diffusion process, which is observed throughout continuous time. The results (limit normal distribution for the MLE and an asymptotic chi-squared likelihood ratio test) correspond exactly to classical asymptotic likelihood results, and follow easily from a central limit theorem for stochastic integrals.

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Asymptotic likelihood theory for diffusion processes

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