Consistent Estimation Under Random Censorship When Covariables Are Present

Let (X; Y ) be the variable of interest, where Y is the possibly right-censored lifetime and X is a p-dimensional covariate. We introduce a generalized ACL (Abdushukurov, Cheng, Lin) estimator FXY of FXY (x; y) = P(X 6x; Y 6y) and we prove ' d FXY → ' dFXY a.s. for any integrable function ' under an

Let (X, Y) be the variable of interest, where Y is the possibly right-censored lifetime and X is a p-dimensional covariate. We prove asymptotic normality for a generalized ACL (Abdushukurov-Cheng-Lin) estimator f qgd/~xy of E(q~(X, Y)) under proportional censorship for each function q~ satisfying

Consider the linear models of the form Y=X { ;+= with the response Y censored randomly on the right and X measured erroneously. Without specifying any error models, in this paper, a semiparametric method is applied to the estimation of the parametric vector ; with the help of proper validation data.

In this paper, we establish a new proof of uniform consistency of kernel estimator of density function when we observe a random right censored model. This proof uses an exponential inequality established by Wang (2000). As a consequence, we obtain the almost sure convergence of the kernel estimator