AbstractThe parametric generalized linear model assumes that the conditional distribution of a response Y given a d-dimensional covariate X belongs to an exponential family and that a known transformation of the regression function is linear in X. In this paper we relax the latter assumption by considering a nonparametric function of the linear combination βTX, say η0(βTX). To estimate the coefficient vector β and the nonparametric component η0 we consider local polynomial fits based on kernel weighted conditional likelihoods. We then obtain an estimator of the regression function by simply replacing β and η0 in η0(βTX) by these estimators. We derive the asymptotic distributions of these estimators and give the results of some numerical exp...
Masry (1996b) provides estimation bias and variance expression for a general local polynomial kernel...
AbstractNonparametric quantile regression with multivariate covariates is a difficult estimation pro...
AbstractVarying coefficient models are useful extensions of the classical linear models. Under the c...
AbstractThe parametric generalized linear model assumes that the conditional distribution of a respo...
The typical generalized linear model for a regression of a response Y on predictors (X, Z) has condi...
A natural generalization of the well known generalized linear models is to allow only for some of th...
Fan Heckman andWand proposed locally weighted kernel polynomial regression methods for generalized...
AbstractNonparametric regression estimator based on locally weighted least squares fitting has been ...
This article deals with statistical inferences based on the varying-coefficient models proposed by H...
summary:Local polynomials are used to construct estimators for the value $m(x_{0})$ of the regressio...
Local polynomial fitting has many exciting statistical properties which where established under i.i....
Fan, Heckman and Wand (1995) proposed locally weighted kernel polynomial regression methods for gene...
Nonparametric regression techniques provide an effective way of identifying and examining structure ...
We study generalized additive partial linear models, proposing the use of polynomial spline smoothin...
We study the non-parametric estimation of partially linear generalized single-index functional model...
Masry (1996b) provides estimation bias and variance expression for a general local polynomial kernel...
AbstractNonparametric quantile regression with multivariate covariates is a difficult estimation pro...
AbstractVarying coefficient models are useful extensions of the classical linear models. Under the c...
AbstractThe parametric generalized linear model assumes that the conditional distribution of a respo...
The typical generalized linear model for a regression of a response Y on predictors (X, Z) has condi...
A natural generalization of the well known generalized linear models is to allow only for some of th...
Fan Heckman andWand proposed locally weighted kernel polynomial regression methods for generalized...
AbstractNonparametric regression estimator based on locally weighted least squares fitting has been ...
This article deals with statistical inferences based on the varying-coefficient models proposed by H...
summary:Local polynomials are used to construct estimators for the value $m(x_{0})$ of the regressio...
Local polynomial fitting has many exciting statistical properties which where established under i.i....
Fan, Heckman and Wand (1995) proposed locally weighted kernel polynomial regression methods for gene...
Nonparametric regression techniques provide an effective way of identifying and examining structure ...
We study generalized additive partial linear models, proposing the use of polynomial spline smoothin...
We study the non-parametric estimation of partially linear generalized single-index functional model...
Masry (1996b) provides estimation bias and variance expression for a general local polynomial kernel...
AbstractNonparametric quantile regression with multivariate covariates is a difficult estimation pro...
AbstractVarying coefficient models are useful extensions of the classical linear models. Under the c...