Tracking interval for selecting between non-nested models: An investigation for Type II right censored data

In this paper, we consider the setting where the observed data is incomplete. For the general situation where the number of gaps as well as the number of unobserved values in some gaps go to infinity, the asymptotic behavior of maximum likelihood estimator is not clear. We derive and investigate the asymptotic properties of maximum likelihood estimator under censorship and drive a statistic for testing the null hypothesis that the proposed non-nested models are equally close to the true model against the alternative hypothesis that one model is closer when we are faced with a life-time situation. Furthermore rewrite a normalization of a difference of Akaike criterion for estimating the difference of expected Kullback-Leibler risk between the distributions in two different models.