In a point set in dimension superior to 1, the statistical distribution of the number of pairs of points as a function of distance between the points of the pair is not uniform. This distribution is not considered in a large number of classic methods based on spatially weighted means used in spatial analysis, such as spatial autocorrelation indices, kernel interpolation methods, or spatial modeling methods (autoregressive, or geographically weighted). It has a direct impact on the calculations and the results of indices and estimations, and by not taking into account this distribution of the distances, spatial analysis calculations can be biased. In this article, we introduce a spatial standardization, which corrects and adjusts the calcula...
<p>Spatial autocorrelation, expressed as Moran’s <i>I</i>, with incrementing distance class for the ...
Spatial autocorrelation is an assessment of the correlation between two random variables which descr...
<p>Left: Average over numerical simulations of the model (with km) with the true positions of all c...
In a point set in dimension superior to 1, the statistical distribution of the number of pairs of po...
Distinguishing the analysis of spatial data from classical analysis is only meaningful if the spati...
<div><p>Spatial autocorrelation plays an important role in geographical analysis; however, there is ...
AbstractDifferences in spatial units among spatial data often complicate analyses. Spatial unit conv...
The purpose of this dissertation is to improve the applied researcher's toolbox to estimate spatial ...
Abstract Background When analysing spatial data, it is important to account for spatial autocorrelat...
Econometrics on spatial data : a beginner's guide. This contribution is an introduction to the main...
This contribution is an introduction to the main topics of spatial econometrics. We start analyzing ...
A number of spatial statistic measurements such as Moran's I and Geary's C can be used for spatial a...
Functions to calculate measures of spatial association, especially measures of spatial autocorrelati...
International audienceThe use by geographers of local indicators of spatial autocorrelation has spre...
Most data mining projects in spatial economics start with an evaluation of a set of attribute variab...
<p>Spatial autocorrelation, expressed as Moran’s <i>I</i>, with incrementing distance class for the ...
Spatial autocorrelation is an assessment of the correlation between two random variables which descr...
<p>Left: Average over numerical simulations of the model (with km) with the true positions of all c...
In a point set in dimension superior to 1, the statistical distribution of the number of pairs of po...
Distinguishing the analysis of spatial data from classical analysis is only meaningful if the spati...
<div><p>Spatial autocorrelation plays an important role in geographical analysis; however, there is ...
AbstractDifferences in spatial units among spatial data often complicate analyses. Spatial unit conv...
The purpose of this dissertation is to improve the applied researcher's toolbox to estimate spatial ...
Abstract Background When analysing spatial data, it is important to account for spatial autocorrelat...
Econometrics on spatial data : a beginner's guide. This contribution is an introduction to the main...
This contribution is an introduction to the main topics of spatial econometrics. We start analyzing ...
A number of spatial statistic measurements such as Moran's I and Geary's C can be used for spatial a...
Functions to calculate measures of spatial association, especially measures of spatial autocorrelati...
International audienceThe use by geographers of local indicators of spatial autocorrelation has spre...
Most data mining projects in spatial economics start with an evaluation of a set of attribute variab...
<p>Spatial autocorrelation, expressed as Moran’s <i>I</i>, with incrementing distance class for the ...
Spatial autocorrelation is an assessment of the correlation between two random variables which descr...
<p>Left: Average over numerical simulations of the model (with km) with the true positions of all c...