In biomedical and public health research, both repeated measures of biomark
ers Y as well as times T to key clinical events are often collected for a s
ubject. The scientific question is how the distribution of the responses [T
, YIX] changes with covariates X [T/X] may be the focus of the estimation w
here Y can be used as a surrogate for T. Alternatively, T may be the time t
o drop-out in a study in which [YIX] is the target for estimation. Also, th
e focus of a study might be on the effects of covariates X on both T and Y
or on some underlying latent variable which is thought to be manifested in
the observable outcomes. In this paper, we present a general model for the
joint analysis of [T, YIX] and apply the model to estimate [TIX] and other
related functionals by using the relevant information in both T and Y. We a
dopt a latent variable formulation like that of Fawcett and Thomas and use
it to estimate several quantities of clinical relevance to determine the ef
ficacy of a treatment in a clinical trial setting. We use a Markov chain Mo
nte Carlo algorithm to estimate the model's parameters. We illustrate the m
ethodology with an analysis of data from a clinical trial comparing risperi
done with a placebo for the treatment of schizophrenia.