In this paper we study a family of linear regression models with spatial dependence in the errors and in the dependent variable. The spatial dependence is modeled by arbitrary matrix functions Vn and Mn respectively, indexed by a scalar parameter and, eventually, by two (possibly distinct) weight matrices, D and W. We define the quasi maximum likelihood estimator and study its asymptotic properties under non-Gaussian errors. We use the results on the general model to define a wide class of spatial models, defined as matrix transformations of a given weight matrix. This family is large enough to encompass some popular models used in the spatial econometric literature, such as SARAR and MESS models. By defining broad families of models, where...
vii, 151 p. : ill. (some col.) ; 30 cm.PolyU Library Call No.: [THS] LG51 .H577P AMA 2011 ZhangThis ...
This paper studies large sample properties of the matrix exponential spatial specification (MESS). W...
This paper investigates the adequacy of the matrix exponential spatial specifications (MESS) as an ...
This study investigates and quantifies the effect of different specifications of the spatial weights...
This article considers quasi-maximum likelihood estimations (QMLE) for two spatial panel data regres...
Higher-order spatial econometric models that include more than one weights matrix have seen increasi...
International audienceSpatial regression models rely on simultaneous autoregressive processes that m...
This paper investigates the quasi-maximum likelihood (QML) estimation of spatial panel data models w...
This article provides a survey of the specification and estimation of spatial panel data models. The...
Abstract The (quasi-) maximum likelihood estimator (MLE) for the autoregressive parameter in a spati...
Central limit theorems are developed for instrumental variables estimates of linear and semiparametr...
When a linear model is used to analyze spatially correlated data, but the form of the spatial correl...
The (quasi-) maximum likelihood estimator (QMLE) for the autoregres-sive parameter in a spatial auto...
In this dissertation, the analysis of spatial data through regression is investigated. Multiple obse...
vii, 151 p. : ill. (some col.) ; 30 cm.PolyU Library Call No.: [THS] LG51 .H577P AMA 2011 ZhangThis ...
This paper studies large sample properties of the matrix exponential spatial specification (MESS). W...
This paper investigates the adequacy of the matrix exponential spatial specifications (MESS) as an ...
This study investigates and quantifies the effect of different specifications of the spatial weights...
This article considers quasi-maximum likelihood estimations (QMLE) for two spatial panel data regres...
Higher-order spatial econometric models that include more than one weights matrix have seen increasi...
International audienceSpatial regression models rely on simultaneous autoregressive processes that m...
This paper investigates the quasi-maximum likelihood (QML) estimation of spatial panel data models w...
This article provides a survey of the specification and estimation of spatial panel data models. The...
Abstract The (quasi-) maximum likelihood estimator (MLE) for the autoregressive parameter in a spati...
Central limit theorems are developed for instrumental variables estimates of linear and semiparametr...
When a linear model is used to analyze spatially correlated data, but the form of the spatial correl...
The (quasi-) maximum likelihood estimator (QMLE) for the autoregres-sive parameter in a spatial auto...
In this dissertation, the analysis of spatial data through regression is investigated. Multiple obse...
vii, 151 p. : ill. (some col.) ; 30 cm.PolyU Library Call No.: [THS] LG51 .H577P AMA 2011 ZhangThis ...
This paper studies large sample properties of the matrix exponential spatial specification (MESS). W...
This paper investigates the adequacy of the matrix exponential spatial specifications (MESS) as an ...