Efficient semiparametric and parametric estimates are developed for a spatial autoregressive model, containing non-stochastic explanatory variables and innovations suspected to be non-normal. The main stress is on the case of distribution of unknown, nonparametric, form, where series nonparametric estimates of the score function are employed in adaptive estimates of parameters of interest. These estimates are as efficient as the ones based on a correct form, in particular they are more efficient than pseudo-Gaussian maximum likelihood estimates at non-Gaussian distributions. Two different adaptive estimates are considered, relying on somewhat different regularity conditions. A Monte Carlo study of finite sample performance is included. (C) ...
We examine a higher-order spatial autoregressive model with stochastic, but exogenous, spatial weigh...
International audienceThis paper deals with the estimation of a autoregression function at a given p...
We construct efficient robust truncated sequential estimators for the pointwise estimation problem i...
Efficient semiparametric and parametric estimates are developed for a spatial autoregressive model, ...
E ¢ cient semiparametric and parametric estimates are developed for a spatial autoregressive model, ...
In a general class of semiparametric pure spatial models (having no explanatory variables) allowing ...
This paper investigates asymptotic properties of the maximum likelihood estimator and the quasi-maxi...
We propose profile quasi-maximum likelihood estimation of spatial autoregressive models that are par...
We propose profile quasi-maximum likelihood estimation of spatial autoregressive models that are par...
Some of the research papers presented at an national conference held in 2005 in Beijing that was the...
We propose profile quasi-maximum likelihood estimation of spatial autoregressive models that are par...
Abstract The (quasi-) maximum likelihood estimator (MLE) for the autoregressive parameter in a spati...
Spatial process, asymptotic normality, consistency, lattice sampling, stochastic difference equation...
The (quasi-) maximum likelihood estimator (QMLE) for the autoregres-sive parameter in a spatial auto...
We obtain semiparametric efficiency bounds for estimation of a location parameter in a time series m...
We examine a higher-order spatial autoregressive model with stochastic, but exogenous, spatial weigh...
International audienceThis paper deals with the estimation of a autoregression function at a given p...
We construct efficient robust truncated sequential estimators for the pointwise estimation problem i...
Efficient semiparametric and parametric estimates are developed for a spatial autoregressive model, ...
E ¢ cient semiparametric and parametric estimates are developed for a spatial autoregressive model, ...
In a general class of semiparametric pure spatial models (having no explanatory variables) allowing ...
This paper investigates asymptotic properties of the maximum likelihood estimator and the quasi-maxi...
We propose profile quasi-maximum likelihood estimation of spatial autoregressive models that are par...
We propose profile quasi-maximum likelihood estimation of spatial autoregressive models that are par...
Some of the research papers presented at an national conference held in 2005 in Beijing that was the...
We propose profile quasi-maximum likelihood estimation of spatial autoregressive models that are par...
Abstract The (quasi-) maximum likelihood estimator (MLE) for the autoregressive parameter in a spati...
Spatial process, asymptotic normality, consistency, lattice sampling, stochastic difference equation...
The (quasi-) maximum likelihood estimator (QMLE) for the autoregres-sive parameter in a spatial auto...
We obtain semiparametric efficiency bounds for estimation of a location parameter in a time series m...
We examine a higher-order spatial autoregressive model with stochastic, but exogenous, spatial weigh...
International audienceThis paper deals with the estimation of a autoregression function at a given p...
We construct efficient robust truncated sequential estimators for the pointwise estimation problem i...