Open AccessEquivariance and Generalized Inference in Two‐Sample Location‐Scale Families
Author(s) -
Sévérien Nkurunziza,
Fuqi Chen
Publication year - 2011
Publication title -
journal of probability and statistics
Language(s) - English
Resource type - Journals
eISSN - 1687-9538
pISSN - 1687-952X
DOI - 10.1155/2011/474826
Subject(s) - mathematics , estimator , inference , equivariant map , extension (predicate logic) , scale (ratio) , location parameter , monte carlo method , statistics , sample (material) , mathematical optimization , computer science , artificial intelligence , pure mathematics , physics , chemistry , chromatography , quantum mechanics , programming language
We are interested in-typical Behrens-Fisher problem in general location-scale families. We present a method of constructing generalized pivotal quantity (GPQ) and generalized P value (GPV) for the difference between two location parameters. The suggested method is based on the minimum risk equivariant estimators (MREs), and thus, it is an extension of the methods based on maximum likelihood estimators and conditional inference, which have been, so far, applied to some specific distributions. The efficiency of the procedure is illustrated by Monte Carlo simulation studies. Finally, we apply the proposed method to two real datasets
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