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Simultaneous confidence intervals for comparing several inverse Gaussian means under heteroscedasticity.

Authors :
Kharrati-Kopaei, Mahmood
Eftekhar, Sana
Source :
Journal of Statistical Computation & Simulation. Mar2017, Vol. 87 Issue 4, p777-790. 14p.
Publication Year :
2017

Abstract

Recently, Zhang [Simultaneous confidence intervals for several inverse Gaussian populations. Stat Probab Lett. 2014;92:125–131] proposed simultaneous pairwise confidence intervals (SPCIs) based on the fiducial generalized pivotal quantity concept to make inferences about the inverse Gaussian means under heteroscedasticity. In this paper, we propose three new methods for constructing SPCIs to make inferences on the means of several inverse Gaussian distributions when scale parameters and sample sizes are unequal. One of the methods results in a set of classic SPCIs (in the sense that it is not simulation-based inference) and the two others are based on a parametric bootstrap approach. The advantages of our proposed methods over Zhang’s (2014) method are: (i) the simulation results show that the coverage probability of the proposed parametric bootstrap approaches is fairly close to the nominal confidence coefficient while the coverage probability of Zhang’s method is smaller than the nominal confidence coefficient when the number of groups and the variance of groups are large and (ii) the proposed set of classic SPCIs is conservative in contrast to Zhang’s method. [ABSTRACT FROM PUBLISHER]

Details

Language :
English
ISSN :
00949655
Volume :
87
Issue :
4
Database :
Academic Search Index
Journal :
Journal of Statistical Computation & Simulation
Publication Type :
Academic Journal
Accession number :
120493565
Full Text :
https://doi.org/10.1080/00949655.2016.1225742