Assessing the accuracy of the maximum likelihood estimator: Observed versus expected Fisher information

Abstract

This paper concerns normal approximations to the distribution of the maximum likelihood estimator in one-parameter families. The traditional variance approximation is 1/§, where θ is the maximum likelihood estimator and § is the expected total Fisher information. Many writers, including R. A. Fisher, have argued in favour of the variance estimate 1/I(x), where I(x) is the observed information, i.e. minus the second derivative of the log likelihood function at θ given data x. We give a frequentist justification for preferring 1/I(x) to 1/§. The former is shown to approximate the conditional variance of 8 given an appropriate ancillary statistic which to a first approximation is I(x). The theory may be seen to flow naturally from Fisher's pioneering papers on likelihood estimation. A large number of examples are used to supplement a small amount of theory. Our evidence indicates preference for the likelihood ratio method of obtaining confidence limits.

Keywords

MathematicsFisher informationStatisticsLikelihood principleFrequentist inferenceLikelihood functionRestricted maximum likelihoodBias of an estimatorEstimatorConsistent estimatorScoring algorithmEfficient estimatorEconometricsMinimum-variance unbiased estimatorMaximum likelihoodBayesian probabilityBayesian inferenceQuasi-maximum likelihood

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Publication Info

Year: 1978
Type: article
Volume: 65
Issue: 3
Pages: 457-483
Citations: 918
Access: Closed

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APA Style

                            
                                    Bradley Efron, 
                                
                                    D. V. Hinkley
                                
                            (1978). 
                            Assessing the accuracy of the maximum likelihood estimator: Observed versus expected Fisher information. 
                            Biometrika
                            , 65
                            (3)
                            , 457-483.
                            https://doi.org/10.1093/biomet/65.3.457

Identifiers

DOI: 10.1093/biomet/65.3.457