Missing Data and the Mixtures of Discrete and Continuous Random Variables

In this paper very simple nonparametric c l d i c a t i o n rule for mixtures of discrete and oonhuons random variables is described. It ie based on the method of neatest neighbor proposed by COVEB and HABT (1967). The bounds on the limit of the near& neighbor ruleriske are given. Both lower and upp

An efficient algorithm for partitioning the range of a continuous variable to a discrete Ž . number of intervals, for use in the construction of Bayesian belief networks BBNs , is presented here. The partitioning minimizes the information loss, relative to the number of intervals used to represent t

## A very practical application of Bayea's theorem, for the analysis of binomial random variables, ia presented. Previous papers (WALT=, 1985; WALTEBS, 19868) have already demonstrated the reliability of the technique for one, or two random variables, and the extension of the approach t o several

## Abstract When collecting patient‐level resource use data for statistical analysis, for some patients and in some categories of resource use, the required count will not be observed. Although this problem must arise in most reported economic evaluations containing patient‐level data, it is rare f

Liang and Zeger proposed a generalized estimating equations approach to the analysis of longitudinal data. Their models assume that missing observations are missing completely at random in the sense of Rubin. However, when this assumption does not hold, their analysis may yield biased results. In th