Over the past few decades, addressing "spatial confounding" has become a major topic in spatial statistics. However, the literature has provided conflicting definitions, and many proposed solutions do not address the issue of confounding as it is understood in causal inference. We give a clear account of spatial confounding as the existence of an unmeasured confounding variable with a spatial structure. Under certain conditions, including the measurability of the confounder as a function of space, we show that spatial covariates (e.g. latitude and longitude) can be handled by existing causal inference estimation procedures. We focus on "double machine learning" (DML), a procedure in which flexible models are used to regress both the exposur...
In epidemiologic studies, researchers are commonly interested in quantifying geospatial effects on t...
Spatial statistical analyses are often used to study the link between environmental factors and the...
Increasingly, regression models are used when residuals are spatially correlated. Prominent examples...
Spatial causal inference is an emerging field of research with wide ranging areas of applications. A...
The concept of spatial confounding is closely connected to spatial regression, although no general d...
The scientific rigor and computational methods of causal inference have had great impacts on many di...
Many physical quantities around us vary across space or space-time. An example of a spatial quantity...
Spatial models are used in a variety of research areas, such as environmental sciences, epidemiology...
Abstract. Non-gaussian spatial data are very common in many disciplines. For instance, count data ar...
Climate change has been identified as one the main public health challenges of this century and quan...
Most spatial inquiries seek to investigate causal questions about spatial processes, but many quanti...
Thesis (Ph.D.)--University of Washington, 2023Statistical machine learning techniques offer versatil...
Over the last decade, convolution-based models for spatial data have increased in popularity as a re...
A common phenomenon in spatial regression models is spatial confounding. This phenomenon occurs when...
Species distribution models (SDMs) are currently the main tools to derive species niche estimates an...
In epidemiologic studies, researchers are commonly interested in quantifying geospatial effects on t...
Spatial statistical analyses are often used to study the link between environmental factors and the...
Increasingly, regression models are used when residuals are spatially correlated. Prominent examples...
Spatial causal inference is an emerging field of research with wide ranging areas of applications. A...
The concept of spatial confounding is closely connected to spatial regression, although no general d...
The scientific rigor and computational methods of causal inference have had great impacts on many di...
Many physical quantities around us vary across space or space-time. An example of a spatial quantity...
Spatial models are used in a variety of research areas, such as environmental sciences, epidemiology...
Abstract. Non-gaussian spatial data are very common in many disciplines. For instance, count data ar...
Climate change has been identified as one the main public health challenges of this century and quan...
Most spatial inquiries seek to investigate causal questions about spatial processes, but many quanti...
Thesis (Ph.D.)--University of Washington, 2023Statistical machine learning techniques offer versatil...
Over the last decade, convolution-based models for spatial data have increased in popularity as a re...
A common phenomenon in spatial regression models is spatial confounding. This phenomenon occurs when...
Species distribution models (SDMs) are currently the main tools to derive species niche estimates an...
In epidemiologic studies, researchers are commonly interested in quantifying geospatial effects on t...
Spatial statistical analyses are often used to study the link between environmental factors and the...
Increasingly, regression models are used when residuals are spatially correlated. Prominent examples...