Parameter Estimation in the Error-in-Variables Models Using the Gibbs Sampler

This paper studies a semi-linear errors-in-variables model of the form Y i = x$ i ;+ g(T i )+e i , X i =x i +u i (1 i n). The estimators of parameters ;, \_ 2 and of the smooth function g are derived by using the nearest neighbor-generalized least square method. Under some weak conditions, it is sho

In my paper "Use of the Gibbs sampler in expert systems", I attempted to survey statistics and genetics literature of interest to researchers in AII faded to stress, however, that the best reference for understanding Markov chain Monte Carlo (MCMC) methods is the paper by Hastings [3 ], which genera

When the SPR condition is not satisfied then there exist input signals for which the considered output error algorithm is locally unstable. A condition is given which delimits the sharp stability-instability boundary in the case of slow estimation, whereas local stability properties are guaranteed b

## Abatrcrct Consider an experiment where a nonlinear continuous functional relationship exists between y and 5. Assume that this relationship haa been meaaured at n replicatad pointa of X from each of t treatmenta or populations. Assume further that the X are fixed unknown vectors and that the lo

Biomedical studies often measure variables with error. Examples in the literature include investigation of the association between the change in some outcome variable (blood pressure, cholesterol level etc.) and a set of explanatory variables (age, smoking status etc.). Typically, one fits linear re