Precise asymptotics of error variance estimator in partially linear models

In this work. we establish that the error in norm II' between the solution 01' the three-dimensional linear elasticity system and that of the classical Bernoulli-Navies model. for a clamped rod with transversal section having a diameter of order :. is O(c Ii").

Consider the partial linear models of the form Y=X { ;+ g(T)+e, where the p-variate explanatory X is erroneously measured, and both T and the response Y are measured exactly. Let X be the surrogate variable for X with measurement error. Let the primary data set be that containing independent observa

In mixed linear models with two variance components, classes of estimators improving on ANOVA estimators for the variance components and the ratio of variances are constructed on the basis of the invariant statistics. Out of the classes, consistent, improved and positive estimators are singled out.

Two types of recursive estimators are developed for the variance components 2 and 2 of the dynamic linear model: non-Bayesian and Bayesian. From a frequentist point of view, both types of estimators are mean square consistent. The non-Bayesian estimator of 2 is also unbiased.