Selecting among weibull, lognormal and gamma distributions using complete and censored smaples

In a recent paper, Kent and Quesenberry [19] considered using certain optimal invariant statistics to select the best fitting member of a collection of probability distributions using complete samples of life data. In the present work extensions of this approach in two directions are given. First, selection for complete samples based on scale and shape invariant statistics is considered. Next, the selection problem for type I censored samples is considered, and both scale invariant and maximum likelihood selection procedures are studied. The two-parameter (scale and shape) Weibull, lognormal, and gamma distributions are considered and applications to real data are given. Results from a (small) comparative simulation study are presented.

[1]  A. Dyer Discrimination Procedures for Separate Families of Hypotheses , 1973 .

[2]  R. Starbuck,et al.  On optimal tests for separate hypotheses and conditional probability integral transformations , 1976 .

[3]  Charles E. Antle,et al.  Discrimination Between the Log-Normal and the Weibull Distributions , 1973 .

[4]  C. Quesenberry,et al.  Selecting Among Probability Distributions Used in Reliability , 1982 .

[5]  D. Cox Tests of Separate Families of Hypotheses , 1961 .

[6]  S. C. Saunders,et al.  A Statistical Model for Life-Length of Materials , 1958 .

[7]  Albert H. Moore,et al.  Maximum-Likelihood Estimation of the Parameters of Gamma and Weibull Populations from Complete and from Censored Samples , 1965 .

[8]  A. Cohen,et al.  Maximum Likelihood Estimation in the Weibull Distribution Based On Complete and On Censored Samples , 1965 .

[9]  D. J. Bartholomew,et al.  The Sampling Distribution of an Estimate Arising in Life Testing , 1963 .

[10]  J Bain Lee,et al.  Probability of correct selection of weibull versus gamma based on livelihood ratio , 1980 .

[11]  A. H. Moore,et al.  Local-Maximum-Likelihood Estimation of the Parameters of Three-Parameter Lognormal Populations from Complete and Censored Samples , 1966 .

[12]  P. Sen,et al.  Theory of rank tests , 1969 .

[13]  E. Lehmann Testing Statistical Hypotheses , 1960 .

[14]  Philip Rabinowitz,et al.  Methods of Numerical Integration , 1985 .

[15]  J. Aitchison,et al.  The Lognormal Distribution. , 1958 .

[16]  R. Randles,et al.  On the Selection of the Underlying Distribution and Adaptive Estimation , 1972 .

[17]  R. E. Barlow,et al.  Total time on test processes and applications to failure data , 1975 .

[18]  David Durand,et al.  Aids for Fitting the Gamma Distribution by Maximum Likelihood , 1960 .

[19]  A. Dyer Hypothesis testing procedures for separate families of hypotheses , 1974 .

[20]  V. A. Uthoff,et al.  The Most Powerful Scale and Location Invariant Test of the Normal Versus the Double Exponential , 1973 .

[21]  V. A. Uthoff An Optimum Test Property of Two Weil-Known Statistics , 1970 .