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Rank Invariant Tests for Interval Censored Data under the Grouped Continuous Model - MaRDI portal

Rank Invariant Tests for Interval Censored Data under the Grouped Continuous Model

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Publication:4335751

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DOI10.2307/2533044zbMath0868.62038OpenAlexW2037740238WikidataQ36819480 ScholiaQ36819480MaRDI QIDQ4335751

Michael P. Fay

Publication date: 11 August 1997

Published in: Biometrics (Search for Journal in Brave)

Full work available at URL: https://doi.org/10.2307/2533044

zbMATH Keywords

ordered categorical data grouped data interval censored data graphical test linear rank test weighted log-rank test location shift model coarsened at random breast cosmesis logistic error rank invariant score tests

Mathematics Subject Classification ID

Nonparametric hypothesis testing (62G10) Applications of statistics to biology and medical sciences; meta analysis (62P10)

Related Items (15)

Rank invariant tests with left truncated and interval censored data ⋮ Bayesian nonparametric \(k\)-sample tests for censored and uncensored data ⋮ Frequentist and Bayesian approaches for interval-censored data ⋮ Midrank unification of rank tests for exact, tied, and censored data ⋮ A Nonparametric Test for Interval-Censored Failure Time Data with Unequal Censoring ⋮ Saddlepoint approximations for rank‐invariant permutation tests and confidence intervals with interval‐censoring ⋮ Using Conditional Logistic Regression to Fit Proportional Odds Models to Interval Censored Data ⋮ A Class of Permutation Tests for Stratified Survival Data ⋮ A comparison of some two-sample tests with interval censored data ⋮ Tutorial on methods for interval-censored data and their implementation in R ⋮ Nonparametric tests for left-truncated and interval-censored data ⋮ A comparative study of two-sample tests for interval-censored data ⋮ A simple nonparametric two-sample test for the distribution function of event time with interval censored data ⋮ An overview of methods for interval-censored data with an emphasis on applications in dentistry ⋮ A generalized Fleming and Harrington's class of tests for interval-censored data

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