These data are supplementary material to Ziegler & Heidbach (2020) and present the results of a 3D geomechanical-numerical model of the stress state with quantified uncertainties. The average modelled stress state is provided for each of the six components of the full stress tensor. In addition, the associated standard deviation for each component is provided. The modelling approach uses a published lithological model and the used data is described in the publication Ziegler & Heidbach (2020). The reduced stress tensor is derived using the Tecplot Addon GeoStress (Stromeyer & Heidbach, 2017).

The model results are provided in a comma-separated ascii file. Each line in the file represents one of the approx. 3 million finite elements that comprise the model. The following data are provided for each element. 1 - Location X / Easting (UTM 32)[m]2 - Location Y / Northing (UTM 32)[m]3 - Location Z / Depth below sea level [m]4 - Average of Sigma XX component of the stress tensor [Pa]5 - Standard Deviation of Sigma XX component of the stress tensor [Pa]6 - Average of Sigma YY component of the stress tensor [Pa]7 - Standard Deviation of Sigma YY component of the stress tensor [Pa]8 - Average of Sigma ZZ component of the stress tensor [Pa]9 - Standard Deviation of Sigma ZZ component of the stress tensor [Pa]10 - Average of Sigma XY component of the stress tensor [Pa]11 - Standard Deviation of Sigma XY component of the stress tensor [Pa]12 - Average of Sigma YZ component of the stress tensor [Pa]13 - Standard Deviation of Sigma YZ component of the stress tensor [Pa]14 - Average of Sigma ZX component of the stress tensor [Pa]15 - Standard Deviation of Sigma ZX component of the stress tensor [Pa]16 - Average of the maximum horizontal stress component (SHmax) [Pa]17 - Standard Deviation of the maximum horizontal stress component (SHmax) [Pa]18 - Average of the minimum horizontal stress component (Shmin) [Pa]19 - Standard Deviation of the minimum horizontal stress component (Shmin) [Pa]20 - The vertical stress component (Sv) [Pa]21 - Average of the differential stress (S1-S3) [Pa]22 - Standard Deviation of the differential stress (S1-S3) [Pa]