Estimation of a distribution function by an indirect sample

In this paper improved estimators of the scale and its reciprocal, 0(0-1), and the location, #, of a two-parameter exponential distribution are given based on a doubly censored sample. Also the problem of estimating the linear function # + zO is considered, where z is a given constant. It is shown t

We consider the e cient estimation of a bivariate distribution function (DF) under the class of radially symmetric distributions and propose an estimator based on the mean of the empirical distribution and survival functions. We obtain the mean and variance of the estimator and show that it has an a

Let \(\bar{F}_{n}\) be an estimator of an IFRA survival function \(F\) and let \(A\) be such that \(0<\bar{F}(A)<1\). The main result constructs an IFRA estimator by splicing the smallest increasing failure rate on the average majorant and greatest increasing failure rate on the average minorant of

The optimal bandwidth of the d-dimensional kernel estimator of a density is well known to have order n l.,(4+d). In this note, the multivariate distribution function F(x) is estimated by integrating a kernel estimator of its density. The asymptotic optimal bandwidth of the d-dimensional kernel dist