【 摘 要 】

Suppose that p(n)(.; theta) is the joint probability density of n observations which are not necessarily i.i.d. In this paper we discuss the estimation of an unknown parameter u of a family of ''curved probability densities'' defined by M = {p(n)(.; theta(u)), dim u < dim theta} embedded in S = {p(n)(.; theta), theta is-an-element-of THETA}, and develop the higher order asymptotic theory. The third-order Edgeworth expansion for a class of estimators is derived. It is shown that the maximum likelihood estimator is still third-order asymptotically optimal in our general situation. However, the Edgeworth expansion contains two terms which vanish in the case of curved exponential family. Regarding this point we elucidate some results which did not appear in Amari's framework. Our results are applicable to time series analysis and multivariate analysis. We give a few examples (e.g., a family of curved ARMA models, a family of curved regression models). (C) 1994 Academic Press, Inc.

【 授权许可】

Free   

【 预 览 】

附件列表

Files	Size	Format	View
10_1006_jmva_1994_1004.pdf	615KB	PDF	download