JOURNAL ARTICLE
The interpretation of maximum‐likelihood estimation
D. A. SprottRomán Viveros‐Aguilera
Year: 1984 Journal: Canadian Journal of Statistics Vol: 12 (1)Pages: 27-38 Publisher: Wiley
Abstract
Abstract Maximum‐likelihood estimation is interpreted as a procedure for generating approximate pivotal quantities, that is, functions u ( X ;θ) of the data X and parameter θ that have distributions not involving θ. Further, these pivotals should be efficient in the sense of reproducing approximately the likelihood function of θ based on X , and they should be approximately linear in θ. To this end the effect of replacing θ by a parameter ϕ = ϕ(θ) is examined. The relationship of maximum‐likelihood estimation interpreted in this way to conditional inference is discussed. Examples illustrating this use of maximum‐likelihood estimation on small samples are given.
Keywords:
Maximum likelihood Likelihood function Maximum likelihood sequence estimation Restricted maximum likelihood Mathematics Interpretation (philosophy) Inference Estimation theory Statistics Likelihood principle Estimation Applied mathematics Function (biology) Expectation–maximization algorithm Quasi-maximum likelihood Computer science Artificial intelligence Engineering
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Citation History
Topics
Advanced Statistical Methods and Models
Physical Sciences → Mathematics → Statistics and Probability
Statistical Methods and Bayesian Inference
Physical Sciences → Mathematics → Statistics and Probability
Statistical Methods and Inference
Physical Sciences → Mathematics → Statistics and Probability
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