The development of a general inferential theory for nonlinear models with cross-sectionally or spatially dependent data has been hampered by a lack of appropriate limit theorems. To facilitate a general asymptotic inference theory relevant to economic applications, this paper first extends the notion of near-epoch dependent (NED) processes used in the time series literature to random fields. The class of processes that is NED on, say, an -mixing process, is shown to be closed under infinite transformations, and thus accommodates models with spatial dynamics. This would generally not be the case for the smaller class of -mixing processes. The paper then derives a central limit theorem and law of large numbers for NED random fields. These lim...
Nonparametric regression with spatial, or spatio-temporal, data is considered. The conditional mean ...
A nearly unstable sequence of stationary spatial autoregressive processes is investigated, where the...
We define the local empirical process, based on n i.i.d. random vectors in dimension d, in the neigh...
Random field Spatial process Central limit theorem Uniform law of large numbers Law of large numbers...
22 pagesThis paper establishes a central limit theorem and an invariance principle for a wide class ...
AbstractThis paper establishes a central limit theorem and an invariance principle for a wide class ...
Let (Xi,j: i, j ∈ Z) be a stationary random field on the lattice. Let F be the distribution function...
In many scientific disciplines, there is frequently a need to describe purely spatial interactions a...
Summary. We consider statistical and computational aspects of simulation-based Bayesian inference fo...
The thesis is devoted to limit theorems for stochastic models with long-range dependence. We first c...
This paper establishes a central limit theorem (CLT) for empirical processes indexed by smooth funct...
Central limit theorems are established for the sum, over a spatial region, of observations from a li...
Abstract. In the models we will consider, space is represented by a grid of sites that can be in one...
Building on work of McLeish, we present a number of invariance principles for doubly indexed arrays ...
The coefficient of tail dependence η and a slowly varying function L provide information about pairw...
Nonparametric regression with spatial, or spatio-temporal, data is considered. The conditional mean ...
A nearly unstable sequence of stationary spatial autoregressive processes is investigated, where the...
We define the local empirical process, based on n i.i.d. random vectors in dimension d, in the neigh...
Random field Spatial process Central limit theorem Uniform law of large numbers Law of large numbers...
22 pagesThis paper establishes a central limit theorem and an invariance principle for a wide class ...
AbstractThis paper establishes a central limit theorem and an invariance principle for a wide class ...
Let (Xi,j: i, j ∈ Z) be a stationary random field on the lattice. Let F be the distribution function...
In many scientific disciplines, there is frequently a need to describe purely spatial interactions a...
Summary. We consider statistical and computational aspects of simulation-based Bayesian inference fo...
The thesis is devoted to limit theorems for stochastic models with long-range dependence. We first c...
This paper establishes a central limit theorem (CLT) for empirical processes indexed by smooth funct...
Central limit theorems are established for the sum, over a spatial region, of observations from a li...
Abstract. In the models we will consider, space is represented by a grid of sites that can be in one...
Building on work of McLeish, we present a number of invariance principles for doubly indexed arrays ...
The coefficient of tail dependence η and a slowly varying function L provide information about pairw...
Nonparametric regression with spatial, or spatio-temporal, data is considered. The conditional mean ...
A nearly unstable sequence of stationary spatial autoregressive processes is investigated, where the...
We define the local empirical process, based on n i.i.d. random vectors in dimension d, in the neigh...