论文信息 - Statistical inference for censored bivariate normal distributions based on induced order statistics

Statistical inference for censored bivariate normal distributions based on induced order statistics

SUMMARY For a censored sample from a bivariate normal distribution consisting of the first k of n order statistics of one variable and the induced order statistics of the other variable, the maximum likelihood estimators of the parameters and the associated large sample covariance matrix are derived. The likelihood ratio test for independence is also given and its power properties studied. These methods are useful in selection problems or in life testing situations in which concomitant variates are observable only for the uncensored primary variates.

Frank E. Harrell | Pranab Kumar Sen

[1] A. Gupta,et al. ESTIMATION OF THE MEAN AND STANDARD DEVIATION OF A NORMAL POPULATION FROM A CENSORED SAMPLE , 1952 .

[2] P. K. Bhattacharya. Convergence of Sample Paths of Normalized Sums of Induced Order Statistics , 1974 .

[3] D.,et al. Regression Models and Life-Tables , 2022 .

[4] MOMENTS OF SAMPLE MOMENTS OF CENSORED SAMPLES FROM A NORMAL POPULATION , 1958 .

[5] P. Sen. Weak Convergence of Progressively Censored Likelihood Ratio Statistics and its Role in Asymptotic Theory of Life Testing , 1976 .

[6] G. A. Watterson. Linear Estimation in Censored Samples from Multivariate Normal Populations , 1959 .

[7] L. K. Chan. Remark on the Linearized Maximum Likelihood Estimate , 1967 .

[8] A. E. Sarhan,et al. Contributions to order statistics , 1964 .

[9] Janos Galambos,et al. The asymptotic theory of concomitants of order statistics , 1974 .

[10] H. Harter. Expected values of normal order statistics , 1961 .

[11] A. E. Sarhan,et al. Contributions to order statistics , 1964 .

[12] David R. Cox,et al. Regression models and life tables (with discussion , 1972 .

[13] H. A. David. The theory of competing risks , 1980 .

[14] J. G. Saw. The bias of the maximum likelihood estimates of the location and scale parameters given a type II censored normal sample , 1961 .

[15] J. G. Saw. ESTIMATION OF THE NORMAL POPULATION PARAMETERS GIVEN A SINGLY CENSORED SAMPLE , 1959 .