Pseudo maximum likelihood estimates are developed for higher-order spatial autoregressive models with increasingly many parameters, including models with spatial lags in the dependent variables both with and without a linear or nonlinear regression component, and regression models with spatial autoregressive disturbances. Consistency and asymptotic normality of the estimates are established. Monte Carlo experiments examine finite-sample behaviour
The quasi-maximum likelihood estimator for the autoregressive parameter in a spatial autoregression...
We develop refined inference for spatial regression models with predetermined regressors. The ordina...
We propose profile quasi-maximum likelihood estimation of spatial autoregressive models that are par...
Pseudo maximum likelihood estimates are developed for higher-order spatial autoregres- sive models w...
Pseudo maximum likelihood estimates are developed for higher-order spatial autoregressive models wit...
This paper develops consistency and asymptotic normality of parameter estimates for a higher-order s...
This paper develops consistency and asymptotic normality of parameter estimates for a higher-order s...
AbstractThis paper develops consistency and asymptotic normality of parameter estimates for a higher...
We develop refined inference for spatial regression models with predetermined regressors. The ordin...
We examine a higher-order spatial autoregressive model with stochastic, but exogenous, spatial weigh...
Efficient semiparametric and parametric estimates are developed for a spatial autoregressive model, ...
We examine a higher-order spatial autoregressive model with stochastic, but exogenous, spatial weigh...
Explosive growth in the size of spatial databases has highlighted the need for spatial data mining t...
The (quasi-) maximum likelihood estimator (MLE) for the autoregressive parameter in a spatial autore...
This paper presents a fundamentally improved statement on asymptotic behaviour of the well-known Gau...
The quasi-maximum likelihood estimator for the autoregressive parameter in a spatial autoregression...
We develop refined inference for spatial regression models with predetermined regressors. The ordina...
We propose profile quasi-maximum likelihood estimation of spatial autoregressive models that are par...
Pseudo maximum likelihood estimates are developed for higher-order spatial autoregres- sive models w...
Pseudo maximum likelihood estimates are developed for higher-order spatial autoregressive models wit...
This paper develops consistency and asymptotic normality of parameter estimates for a higher-order s...
This paper develops consistency and asymptotic normality of parameter estimates for a higher-order s...
AbstractThis paper develops consistency and asymptotic normality of parameter estimates for a higher...
We develop refined inference for spatial regression models with predetermined regressors. The ordin...
We examine a higher-order spatial autoregressive model with stochastic, but exogenous, spatial weigh...
Efficient semiparametric and parametric estimates are developed for a spatial autoregressive model, ...
We examine a higher-order spatial autoregressive model with stochastic, but exogenous, spatial weigh...
Explosive growth in the size of spatial databases has highlighted the need for spatial data mining t...
The (quasi-) maximum likelihood estimator (MLE) for the autoregressive parameter in a spatial autore...
This paper presents a fundamentally improved statement on asymptotic behaviour of the well-known Gau...
The quasi-maximum likelihood estimator for the autoregressive parameter in a spatial autoregression...
We develop refined inference for spatial regression models with predetermined regressors. The ordina...
We propose profile quasi-maximum likelihood estimation of spatial autoregressive models that are par...