• Title of article

    Analysis of two-sample truncated data using generalized logistic models

  • Author/Authors

    Li، نويسنده , , Gang and Qin، نويسنده , , Jing، نويسنده ,

  • Issue Information
    دوفصلنامه با شماره پیاپی سال 2006
  • Pages
    23
  • From page
    675
  • To page
    697
  • Abstract
    Parallel to Coxʹs [JRSS B34 (1972) 187–230] proportional hazards model, generalized logistic models have been discussed by Anderson [Bull. Int. Statist. Inst. 48 (1979) 35–53] and others. The essential assumption is that the two densities ratio has a known parametric form. A nice property of this model is that it naturally relates to the logistic regression model for categorical data. In astronomic, demographic, epidemiological, and other studies the variable of interest is often truncated by an associated variable. This paper studies generalized logistic models for the two-sample truncated data problem, where the two lifetime densities ratio is assumed to have the form exp { α + φ ( x ; β ) } . Here φ is a known function of x and β , and the baseline density is unspecified. We develop a semiparametric maximum likelihood method for the case where the two samples have a common truncation distribution. It is shown that inferences for β do not depend the nonparametric components. We also derive an iterative algorithm to maximize the semiparametric likelihood for the general case where different truncation distributions are allowed. We further discuss how to check goodness of fit of the generalized logistic model. The developed methods are illustrated and evaluated using both simulated and real data.
  • Keywords
    Likelihood ratio models , Semiparametric maximum likelihood estimate , Biased sampling , Case-control
  • Journal title
    Journal of Multivariate Analysis
  • Serial Year
    2006
  • Journal title
    Journal of Multivariate Analysis
  • Record number

    1558381