Goodness of fit Tests for Generalized Frechet Distribution

@inproceedings{AbdElfattah2012GoodnessOF,
  title={Goodness of fit Tests for Generalized Frechet Distribution},
  author={Abd-Elfattah and Omima A. Fergany},
  year={2012}
}
  • Abd-Elfattah, Omima A. Fergany
  • Published 2012
An important problem in statistics is to obtain information about the form of the population from which the sample is drawn. Goodness of fit test is employed to determine how well the observed sample data "fits" some proposed model. The standard goodness of fit statistics are inappropriate when the parameters of the hypothesized distribution are estimated from the data used for the test. In this paper, we obtain the tables of critical values of modified Kolmogorov-Smirnov (KS) test, Cramer-Von… CONTINUE READING

Citations

Publications citing this paper.

References

Publications referenced by this paper.
Showing 1-10 of 25 references

A new goodness-of-fit test for Type-I extreme-value and 2-parameter Weibull distributions with estimated parameters

M. Liao, T. Shimokawa
Journal of Statistical Computation and Simulation, • 1999
View 5 Excerpts
Highly Influenced

Generalized exponential distribution: Bayesian estimations

Computational Statistics & Data Analysis • 2008
View 4 Excerpts
Highly Influenced

Estimation of the Unknown Parameters of the Generalized Frechet Distribution

A. M. Abd-Elfattah, A.M
Omima, • 2009

Goodness-of-fit for the generalized exponential distribution

A. S. Hassan
Interstat Electronic Journal, • 2005
View 1 Excerpt

Economic and Commerce, Faculty of Commerce, Ain Shames University,1,1-8. "A study on Lomax distribution as a life testing model" ,The

A. M. Abd-Elfattah, A.H
Alharby, • 2004

Goodness of fit tests for the Burr distribution type III based on censored and complete samples" ,The

A. M. Abd-Elfattah, M.A
Dahlan, • 2003

Generalized exponential distributions: different methods of estimation

R. D. Gupta, D. Kundu
Journal of Statistical Computation and Simulation, • 2001
View 1 Excerpt

" The exponentiated Weibull family : some properties and a flood data application "

S. Kotz
Communications in Statistics - Theory and Methods • 1996

The exponentiated Weibull family: some properties and a flood

G. S. Mudholkar, A. D. Huston
1996

Similar Papers

Loading similar papers…