We discuss the prediction of a spatial variable of a multivariate mark composed of both dependent and explanatory variables. The marks are location-dependent and they are attached to a point process. We assume that the marks are assigned independently, conditionally on an unknown underlying parametric field. We compare (i) the classical non-parametric Nadaraya-Watson kernel estimator based on the dependent variable (ii) estimators obtained under an assumption of local parametric model where explanatory variables of the local model are estimated through kernel estimation and (iii) a kernel estimator of the result of the parametric model, supposed here to be a Uniformly Minimum Variance Unbiased Estimator derived under the local parametric mo...
In spatial statistics often the response variable at a given location and time is ob-served together...
International audienceIn this note, we propose a nonparametric spatial estimator of the regression f...
Given a spatial random process (Xi; Yi) 2 E R; i 2 ZN , we investigate a nonparametric estimate of t...
summary:We discuss the prediction of a spatial variable of a multivariate mark composed of both depe...
A spatial marked point process describes the locations of randomly distributed events in a region, w...
In the statistical analysis of spatial point patterns, it is often important to investigate whether ...
International audienceThis paper investigates a nonparametric spatial predictor of a stationary mult...
Spatial point pattern data are routinely encountered. A flexible regression model for the underlying...
The 12th International Conference on Computational and Financial Econometrics (CFE 2018) and the 11t...
In this paper we develop a nonparametric multivariate spatial model that avoids specifying a Gaussia...
We discuss the prediction of the sample variance of marks of a marked spatial point process on a con...
[[abstract]]For a spatial point process model fitted to spatial point pattern data, we develop diagn...
This paper discusses the estimation and plug-in kriging prediction non-stationary spatial process as...
Two characteristics for stationary and isotropic marked point processes, E(r)and V(r), are introduce...
In spatial statistics often the response variable at a given location and time is ob-served together...
International audienceIn this note, we propose a nonparametric spatial estimator of the regression f...
Given a spatial random process (Xi; Yi) 2 E R; i 2 ZN , we investigate a nonparametric estimate of t...
summary:We discuss the prediction of a spatial variable of a multivariate mark composed of both depe...
A spatial marked point process describes the locations of randomly distributed events in a region, w...
In the statistical analysis of spatial point patterns, it is often important to investigate whether ...
International audienceThis paper investigates a nonparametric spatial predictor of a stationary mult...
Spatial point pattern data are routinely encountered. A flexible regression model for the underlying...
The 12th International Conference on Computational and Financial Econometrics (CFE 2018) and the 11t...
In this paper we develop a nonparametric multivariate spatial model that avoids specifying a Gaussia...
We discuss the prediction of the sample variance of marks of a marked spatial point process on a con...
[[abstract]]For a spatial point process model fitted to spatial point pattern data, we develop diagn...
This paper discusses the estimation and plug-in kriging prediction non-stationary spatial process as...
Two characteristics for stationary and isotropic marked point processes, E(r)and V(r), are introduce...
In spatial statistics often the response variable at a given location and time is ob-served together...
International audienceIn this note, we propose a nonparametric spatial estimator of the regression f...
Given a spatial random process (Xi; Yi) 2 E R; i 2 ZN , we investigate a nonparametric estimate of t...