Spatial differencing (SD) is a spatial data transformation pioneered by Holmes (1998) 10 increasingly used to estimate causal effects with non-experimental data. Recently, this transformation has been widely used to deal with omitted variable bias generated by local or site-specific unobservables in a ‘boundary-discontinuity’ design setting. However, as is well known in this literature, SD makes inference problematic. Indeed, given a specific distance threshold, a sample unit may be the neighbor of a number of 15 units on the opposite side of a specific boundary inducing correlation between all dif- ferenced observations that share a common sample unit. By recognizing that the SD transformation produces a special form of dyadic data, we show that the dyadic-robust variance matrix estimator proposed by Cameron and Miller (2014) is, in general, a bet- ter solution compared to the most commonly used estimators.
Spatial Differencing: estimation and Inference / Belotti, Federico; Di Porto, Edoardo; Santoni, Gianluca. - In: CESIFO ECONOMIC STUDIES. - ISSN 1610-241X. - (2018), pp. 1-14. [10.1093/cesifo/ify003]
Spatial Differencing: estimation and Inference
BELOTTI, FEDERICO
;Di Porto, Edoardo;
2018
Abstract
Spatial differencing (SD) is a spatial data transformation pioneered by Holmes (1998) 10 increasingly used to estimate causal effects with non-experimental data. Recently, this transformation has been widely used to deal with omitted variable bias generated by local or site-specific unobservables in a ‘boundary-discontinuity’ design setting. However, as is well known in this literature, SD makes inference problematic. Indeed, given a specific distance threshold, a sample unit may be the neighbor of a number of 15 units on the opposite side of a specific boundary inducing correlation between all dif- ferenced observations that share a common sample unit. By recognizing that the SD transformation produces a special form of dyadic data, we show that the dyadic-robust variance matrix estimator proposed by Cameron and Miller (2014) is, in general, a bet- ter solution compared to the most commonly used estimators.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.