Geodesic
On the restricted range in the samples from the gamma population
Applications of Mathematics, Tome 27 (1982) no. 2, pp. 81-86
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Samples from the gamma population are considered which are censored both above and below, that is, $r$ observations below and $s$ observations above are missing among $n$ observations. The range in such censored samples is taken up and the distribution of this restricted range is obtained, which can be compared with that in the complete sample case given in a previous paper.
Samples from the gamma population are considered which are censored both above and below, that is, $r$ observations below and $s$ observations above are missing among $n$ observations. The range in such censored samples is taken up and the distribution of this restricted range is obtained, which can be compared with that in the complete sample case given in a previous paper.
DOI : 10.21136/AM.1982.103949
Classification : 62E15, 62F03
Keywords: gamma distribution; multiple range test; censored samples; restricted range; comparison with complete sample case 
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Lingappaiah, Giri S. On the restricted range in the samples from the gamma population. Applications of Mathematics, Tome 27 (1982) no. 2, pp. 81-86. doi: 10.21136/AM.1982.103949

[1] D. B. Duncan: Multiple range and multiple F-tests. Biometrics, 11 (1955), 1 - 42. | DOI | MR

[2] J. F. Lawless: A prediction problem concerning samples from the exponential distribution with application to life testing. Technometrics 13 (1971), 725 - 730. | DOI

[3] G. S. Lingappaiah: Prediction in exponential life testing. Canadian Journal of Statistics 1 (1973), 113-117. | DOI | MR | Zbl

[4] G. S. Lingappaiah: Prediction in samples from the gamma distribution as applied to life testing. The Australian Journal of Statistics 16 (1974), 30-32. | DOI | MR | Zbl

[5] J. K. Levy: An empirical comparison of several multiple range tests for variances. Journal of American Statistical Association 70 (1975), 180-183. | DOI | Zbl

[6] L. S. Nelson: Use of the range in testing homogeneity of variances. Journal of Quality Technology 7 (1976), 99-100. | DOI

[7] G. C. McDonald: The distribution of a variate based on independent ranges from a uniform population. Technometrics 18 (1976), 349 - 354. | MR | Zbl

[8] G. Singh: On the distribution of range of samples from non-normal populations. Biometrika, 57 (1970), 451-456. | DOI

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