A note of kernel smoothing of an estimator of a periodic function in the multiplicative intensity model

The problem of estimating a smooth quantile function, Q(.), at a fixed point p, 0 < p <: 1, is treated under a nonparametric smoothness condition on Q. The asymptotic relative deficiency of the sample quantile based on the maximum likelihood estimate of the survival function under the proportional h

The traditional method for estimating the linear function of fiied parameters in mixed linear model is a two-stage p r d u r e . In the first stage of this procedure the variance components estimators are calculated and next in the second stage these estimators are taken as true values of variance c

Under the general Gauss-Markov model {y, XI~, a 2 V}, equality of MINQUE and so called 'simple' estimator (1/f)y v (I -XX+)y with f=rank(X:V)rank(X) for 0 "2 is considered. It is revealed that this equality holds if and only if the quadratic form (1/a2)yT(l --XX +)y admits a xZ-distribution under no