This paper is concerned with the estimation of the autoregressive parameter in a widely considered spatial autocorrelation model. The typical estimator for this parameter considered in the literature is the (quasi) maximum likelihood estimator corresponding to a normal density. However, as discussed in this paper, the (quasi) maximum likelihood estimator may not be computationally feasible in many cases involving moderate- or large-sized samples. In this paper we suggest a generalized moments estimator that is computationally simple irrespective of the sample size. We provide results concerning the large and small sample properties of this estimator. 1
The (quasi-) maximum likelihood estimator (QMLE) for the autoregres-sive parameter in a spatial auto...
The traditional approach to estimate spatial models bases on a preconceived spatial weights matrix t...
This paper considers a hierarchically spatial autoregressive and moving average error (HSEARMA) mode...
One important goal of this study is to develop a methodology of in-ference for a widely used Cliff-O...
One important goal of this study is to develop a methodology of in-ference for a widely used Cliff-O...
<p>In this study, we investigate the finite sample properties of the optimal generalized method of m...
This paper proposes a new generalized method of moments (GMM) estimator for spatial panel models wit...
This paper proposes a new generalized method of moments (GMM) estimator for spatial panel models wit...
Using approximations of the score of the log-likelihood function, we derive moment conditions for es...
This dissertation proposes a generalized method of moments (GMM) estimation framework for the spatia...
In this paper, we consider a spatial-autoregressive model with autoregressive disturbances, where we...
Abstract The (quasi-) maximum likelihood estimator (MLE) for the autoregressive parameter in a spati...
This paper investigates asymptotic properties of the maximum likelihood estimator and the quasi-maxi...
One important goal of this study is to develop a methodology of inference for a widely used Cliff-Or...
This paper considers linear models with a spatial autoregressive error structure. Extending Arnold ...
The (quasi-) maximum likelihood estimator (QMLE) for the autoregres-sive parameter in a spatial auto...
The traditional approach to estimate spatial models bases on a preconceived spatial weights matrix t...
This paper considers a hierarchically spatial autoregressive and moving average error (HSEARMA) mode...
One important goal of this study is to develop a methodology of in-ference for a widely used Cliff-O...
One important goal of this study is to develop a methodology of in-ference for a widely used Cliff-O...
<p>In this study, we investigate the finite sample properties of the optimal generalized method of m...
This paper proposes a new generalized method of moments (GMM) estimator for spatial panel models wit...
This paper proposes a new generalized method of moments (GMM) estimator for spatial panel models wit...
Using approximations of the score of the log-likelihood function, we derive moment conditions for es...
This dissertation proposes a generalized method of moments (GMM) estimation framework for the spatia...
In this paper, we consider a spatial-autoregressive model with autoregressive disturbances, where we...
Abstract The (quasi-) maximum likelihood estimator (MLE) for the autoregressive parameter in a spati...
This paper investigates asymptotic properties of the maximum likelihood estimator and the quasi-maxi...
One important goal of this study is to develop a methodology of inference for a widely used Cliff-Or...
This paper considers linear models with a spatial autoregressive error structure. Extending Arnold ...
The (quasi-) maximum likelihood estimator (QMLE) for the autoregres-sive parameter in a spatial auto...
The traditional approach to estimate spatial models bases on a preconceived spatial weights matrix t...
This paper considers a hierarchically spatial autoregressive and moving average error (HSEARMA) mode...