next up previous contents index
Next: 13. Data and Knowledge Up: csahtml Previous: 12.4 Multiple Failures and

References

1
Breslow, N. E. (1974).
Covariance analysis of censored survival data.
Biometrics, 30:89-99.

2
Castillo, E. and Hadi, A. S. (1995).
Modeling lifetime data with application to fatigue models.
Journal of American Statistical Association, 90:1041-1054.

3
Cohen, A. C. (1965).
Maximum likelihood estimation in the Weibull distribution based on complete and censored samples.
Technometrics, 5:579-588.

4
Cohen, A. C. and Whitten, B. J. (1988).
Parameter estimation in reliability and life span models.
Marcel Dekker, New York.

5
Cox, D. R. (1970).
The analysis of binary data.
Methuen, London.

6
Cox, D. R. (1972).
Regression models and life tables (with discussion).
Journal of Royal Statistical Society:B, 34:187-220.

7
Cox, D. R. (1975).
Partial likelihood.
Biometrika, 62:269-276.

8
Cox, D. R. and Lewis, P. A. W. (1966).
The statistical analysis of series of events.
Methuen, London.

9
Crow, L. H. (1982).
Confidence interval procedures for the Weibull process with applications to reliability growth.
Technometrics, 24:67-72.

10
Dubey, S. D. (1967).
Normal and Weibull distributions.
Naval Research Logistics Quarterly, 14:69-79.

11
Farewell, V. T. (1979).
Some results on the estimation of logistic models based on retrospective data.
Biometrika, 66:27-32.

12
Farewell, V. T. and Prentice, R. L. (1980).
The approximation of partial likelihood with emphasis on case-control studies.
Biometrika, 67:273-278.

13
Greenwood, M. (1926).
A report on the natural duration of cancer: Appendix I The 'Errors of Sampling' of the survivorshi tables: Reports on Public Health and Medical Subjects.
His Majesty's Stationery Office, London.

14
Johnson, N. L., Kotz, S., and Balakrishna, N. (1994).
Continuous Univariate Distributions.
John Wiley, New York.

15
Kalbfleish, J. D. and Prentice, R. L. (1980).
The statistical analysis of failure time data.
John Wiley, New York.

16
Kamakura, T. (1996).
Trend analysis of multiple counting processes.
In Jewell, N. P., Kimber, A. C., Lee, M.-L. T., and Whitmore, G. A., editors, Lifetime Data: Models in Reliability and Survival Analysis, pages 149-156. Kluwer Academic Publishers, Dordrecht.

17
Kamakura, T. and Yanagimoto, T. (1983).
Evaluation of the regression parameter estimators in the proportional hazard model.
Biometrika, 70:530-533.

18
Kaplan, E. L. and Meier, P. (1958).
Nonparametric estimation from incomplete observations.
Journal of American Statistical Association, 53:457-481.

19
Korn, E. L. and Whittemoore, A. (1979).
Methods for analysing panel studies of acute health effects of air pollution.
Biometrics, 35:795-802.

20
Lawless, J. F. and Nadeau, J. C. (1993).
Some simple robust methods for the analysis of recurrent events.
University of Waterloo IIQP Research Report.

21
Menon, M. (1963).
Estimation of the shape and scale parameters of the Weibull distributions.
Technometrics, 5:175-182.

22
Miller, R. G. (1981).
Survival analysis.
John Wiley, New York.

23
Musa, J. D., Iannino, A., and Okumoto, K. (1987).
Software Reliablility.
McGraw-Hill, New York.

24
Nagatsuka, H. and Kamakura, T. (2003).
A new method of inference for Weibull shape parameter (in Japanese).
Journal of Reliability Engineering Association of Japan, 25:583-593.

25
Nagatsuka, H. and Kamakura, T. (2004).
Parameter estimation of the shape parameter of the Castillo-Hadi model.
Communications in Statistics: Theory and Methods, 33:15-27.

26
Nelson, W. B. (1992).
Confidence limits for recurrence data - applied to cost or number of product repairs and of disease episodes.
Technometrics, 22:1023-1031.

27
Oaks, D. (2001).
Biometrika centenary: Survival analysis.
Biometrika, 88:99-142.

28
Peto, R. (1972).
Discussion of paper by D. R. Cox.
Journal of Royal Statistical Society:B, 34:205-207.

29
Pregibon, D. (1982).
Resistant fits for some commonly used logistic models with medical applications.
Biometrics, 38:485-498.

30
Prentice, R. L. and Breslow, N. E. (1978).
Restrospective studies and failure time models.
Biometrika, 65:153-158.

31
Yanagimoto, T. and Kamakura, T. (1984).
The maximum full and partial likelihood estimators in the proportional hazard model.
Annals of the Institute of Statistical Mathematics, 36:363-373.



Subsections