An Inverse Problem Approach for the Estimation of the Haverkamp and van Genuchten Retention Curves Parameters with the Luus-Jaakola Method

Authors

  • F. F. Ferreira Universidade Federal Fluminense
  • M. De O. Temperini
  • W. R. Telles Universidade Federal Fluminense
  • G. B. Lyra Universidade Federal Rural do Rio de Janeiro
  • A. J. Silva Neto Universidade do Estado do Rio de Janeiro

DOI:

https://doi.org/10.5540/tcam.2021.022.02.00265

Keywords:

Richards equation, Inverse problem, Luus-Jaakola

Abstract

In academia, the study of the movement of water in the ground has been widespread since the last century. The same can be determined using the Richards equation. This is a nonlinear parabolic partial differential equation that requires parameters to generate the results of the problem. Some authors have proposed equations that represent the relationship between volumetric moisture and soil water potential, such as Haverkamp and van Genuchten. As main objective of this work, the inverse modeling was implemented to obtain the Richards equation parameters, applying the Luus-Jaakola method. To verify the mathematical model, a sensitivity analysis was performed, which allowed the observation of the effect that each parameter has on the output data, implying a linear dependence. The results produced proved to be satisfactory for the problem analyzed in our research.

Author Biography

F. F. Ferreira, Universidade Federal Fluminense

Department of Natural Sciences

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Published

2021-06-28

How to Cite

Ferreira, F. F., Temperini, M. D. O., Telles, W. R., Lyra, G. B., & Silva Neto, A. J. (2021). An Inverse Problem Approach for the Estimation of the Haverkamp and van Genuchten Retention Curves Parameters with the Luus-Jaakola Method. Trends in Computational and Applied Mathematics, 22(2), 265–278. https://doi.org/10.5540/tcam.2021.022.02.00265

Issue

Vol. 22 No. 2 (2021)

Section

Original Article

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