论文信息 - Strong Consistency of Approximate Maximum Likelihood Estimators with Applications in Nonparametrics

Strong Consistency of Approximate Maximum Likelihood Estimators with Applications in Nonparametrics

Wald's general analytic conditions that imply strong consistency of the approximate maximum likelihood estimators (AMLEs) have been extended by Le Cam, Kiefer and Wolfowitz, Huber, Bahadur, and Perlman. All these conditions use the log likelihood ratio of the type log[f(x, 0)/f(x, 60)], where Oo is the true value of the parameter. However these methods usually fail in the nonparametric case. Thus, in this paper, for each 0 $ 00, we look at the log likelihood ratio of the type log[f (x, 0)/f (x, r(0) )], where O,(0) is a certain parameter selected in a neighborhood V, of 60. Some general analytic conditions that imply strong consistency of the AMLE are given. The results are shown to be applicable to several nonparametric families having densities, e.g., concave distributions functions, and increasing failure rate distributions. In particular, they can be applied to several censored data cases.

Jane-Ling Wang | Jane-ling Wang

[1] J. Kalbfleisch. Statistical Inference Under Order Restrictions , 1975 .

[2] P. J. Huber. The behavior of maximum likelihood estimates under nonstandard conditions , 1967 .

[3] A. Wald. Note on the Consistency of the Maximum Likelihood Estimate , 1949 .

[4] R. R. Bahadur. Rates of Convergence of Estimates and Test Statistics , 1967 .

[5] M. Perlman. On the strong consistency of approximate maximum likelihood estimators , 1972 .

[6] U. Grenander. On the theory of mortality measurement , 1956 .

[7] P. Billingsley,et al. Convergence of Probability Measures , 1969 .

[8] Kai Lai Chung,et al. A Course in Probability Theory , 1949 .

[9] B. Gnedenko,et al. Limit Distributions for Sums of Independent Random Variables , 1955 .

[10] J. Kiefer,et al. CONSISTENCY OF THE MAXIMUM LIKELIHOOD ESTIMATOR IN THE PRESENCE OF INFINITELY MANY INCIDENTAL PARAMETERS , 1956 .

[11] A. W. Marshall,et al. Properties of Probability Distributions with Monotone Hazard Rate , 1963 .

[12] Le Cam,et al. On some asymptotic properties of maximum likelihood estimates and related Bayes' estimates , 1953 .

[13] Prakasa Rao. Estimation of a unimodal density , 1969 .

[14] Tim Robertson,et al. On Estimating a Density which is Measurable with Respect to a $\sigma$-Lattice , 1967 .

[15] Frank Proschan,et al. Maximum Likelihood Estimation for Distributions with Monotone Failure Rate , 1965 .