Nonparametric Estimation and Testing in a Cure Model

Nonparametric Estimation and Testing in a Cure Model

Nonoparametric generalized maximum likelihood product limit point estimators and confidence intervals are given for a cure model with random censorship. One-, two-, and K-sample likelihood ratio tests for inference on the cure rates are developed. In the two-sample case its power is compared to the...

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Veröffentlicht in:Biometrics 1992-12, Vol.48 (4), p.1223-1234
Hauptverfasser: Laska, Eugene M., Meisner, Morris J.
Format: Artikel
Sprache:eng
Schlagworte:
Biological and medical sciences
Biometrics
Biometry - methods
Censorship
Clinical trials
Clinical Trials as Topic - statistics & numerical data
Confidence interval
Estimators
Humans
Inference
Likelihood Functions
Medical cures
Medical sciences
Modeling
Models, Statistical
Psychology. Psychoanalysis. Psychiatry
Psychopathology. Psychiatry
Ratio test
Shorter Communications
Statistics
Survival Rate
Techniques and methods
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Beschreibung
Zusammenfassung:Nonoparametric generalized maximum likelihood product limit point estimators and confidence intervals are given for a cure model with random censorship. One-, two-, and K-sample likelihood ratio tests for inference on the cure rates are developed. In the two-sample case its power is compared to the power of several alternatives, including the log-rank and Gray and Tsiatis (1989, Biometrics 45, 899-904) tests. Implications for the use of the likelihood ratio test in a clinical trial designed to compare cure rates are discussed.
ISSN:0006-341X
1541-0420
DOI:10.2307/2532714