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Part 1: Document Description
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Citation |
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Title: |
Replication Data for: Nonlinear mixed-dimension model for embedded tubular networks with application to root water uptake |
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Identification Number: |
doi:10.18419/darus-2042 |
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Distributor: |
DaRUS |
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Date of Distribution: |
2021-07-06 |
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Version: |
1 |
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Bibliographic Citation: |
Koch, Timo; Wu, Hanchuan; Schneider, Martin, 2021, "Replication Data for: Nonlinear mixed-dimension model for embedded tubular networks with application to root water uptake", https://doi.org/10.18419/darus-2042, DaRUS, V1 |
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Citation |
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Title: |
Replication Data for: Nonlinear mixed-dimension model for embedded tubular networks with application to root water uptake |
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Identification Number: |
doi:10.18419/darus-2042 |
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Authoring Entity: |
Koch, Timo (University of Oslo) |
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Wu, Hanchuan (University of Stuttgart) |
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Schneider, Martin (University of Stuttgart) |
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Grant Number: |
327154368 |
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Grant Number: |
info:eu-repo/grantAgreement/EC/H2020/801133 |
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Distributor: |
DaRUS |
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Access Authority: |
Koch, Timo |
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Access Authority: |
Wu, Hanchuan |
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Access Authority: |
Schneider, Martin |
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Depositor: |
Wu, Hanchuan |
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Date of Deposit: |
2021-06-25 |
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Holdings Information: |
https://doi.org/10.18419/darus-2042 |
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Study Scope |
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Keywords: |
Agricultural Sciences, Computer and Information Science, Earth and Environmental Sciences, Mixed-Dimension Method, Embedded Networks, 1d-3d Coupling, Root Water Uptake, Smoothing Kernel, Nonlinear Elliptic Equations |
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Abstract: |
This dataset contains scripts and data used to reproduce the results in the related publication (<a href="https://arxiv.org/abs/2106.05452">Koch et al. 2021</a>). In detail, it contains data and scripts to show the effect of the Kirchhoff transformation for diffusion coefficients; convergence results for single and mutiple tube(s); as well as transpiration rates and average interface pressures of a 1D-root network embedded in 3D-soil domain. The root network used in the last case is a 8-day-old lupine according to the following publication <a href="https://doi.org/10.3389/fpls.2020.00316">Schnepf et al. 2020</a>. |
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Methodology and Processing |
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Sources Statement |
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Data Access |
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Other Study Description Materials |
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Related Publications |
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Citation |
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Title: |
Timo Koch, Hanchuan Wu, Martin Schneider. (2021). Nonlinear mixed-dimension model for embedded tubular networks with application to root water uptake. Journal of Computational Physics, 110823. |
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Identification Number: |
10.1016/j.jcp.2021.110823 |
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Bibliographic Citation: |
Timo Koch, Hanchuan Wu, Martin Schneider. (2021). Nonlinear mixed-dimension model for embedded tubular networks with application to root water uptake. Journal of Computational Physics, 110823. |
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Label: |
analytical_solutions_multiple_tubes.tar.gz |
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Text: |
Script and data to reproduce Fig. 4 and Figure in Appendix, which are the analytical solutions of soil pressure for multiple parallel tubes over the domain. |
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Notes: |
application/x-gzip |
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average_soil_interface_pressure.tar.gz |
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Text: |
Script and data to reproduce Fig. 15, which shows the average soil pressure for each root segement over depth. |
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Notes: |
application/x-gzip |
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kirchhoff_transformation.tar.gz |
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Script and data to reproduce Fig. 3, which plots an exponential diffusion coefficient and the kirchhoff transformation. |
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Notes: |
application/x-gzip |
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multiple_tubes_convergence.tar.gz |
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Script and data to reproduce Fig. 6-10, which are the grid convergence plots varying root radius, kernel radius and nonlineary coefficient. |
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Notes: |
application/x-gzip |
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root_conductivity.tar.gz |
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Script and data to reproduce Fig. 11, which plots root conductivies and root radius for a lupin root system |
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Notes: |
application/x-gzip |
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single_tube_convergence.tar.gz |
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Script and data to reproduce Fig. 5, which plots grid convergence for single infinite tube |
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Notes: |
application/x-gzip |
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transpiration_rates.tar.gz |
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Script and data to reproudce Fig. 14, which plots transpiration rates for different refinements and methods |
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Notes: |
application/x-gzip |
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van_genuchten_model.tar.gz |
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Script and data to reproduce Fig. 12, which plots characteristic curve for van Genuchten model |
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Notes: |
application/x-gzip |