This work arises from the need of exploring new features for modeling and optimizing water consumption in irrigation processes. In particular, we focus on water flow model in unsaturated soils, accounting also for a root water uptake term, which is assumed to be discontinuos in the state variable. We investigate the possibility of accomplishing such optimization by computing the steady solutions of a theta-based Richards equation revised as equilibrium points of the ODEs system resulting from a numerical semi-dicretization in the space; after such semi-discretization, these equilibrium points are computed exactly as the solutions of a linear system of algebraic equations: the case in which the equilibrium lies on the threshold for the uptake term is of particular interest, since the system considerably simplifies. In this framework, the problem of minimizing the water waste below the root level is investigated. Numerical simulations are provided for representing the obtained results.Article HighlightsRoot water uptake is modelled in a Richards' equation framework with a discontinuoussink term.After a proper semidiscretization in space, equilibrium points of the resultingnonlinear ODE system are computed exactly.The proposed approach simplifies a control problem for optimizing water consumption.

Optimizing Water Consumption in Richards' Equation Framework with Step-Wise Root Water Uptake: A Simplified Model / Berardi, Marco; D'Abbicco, Marcello; Girardi, Giovanni; Vurro, Michele. - In: TRANSPORT IN POROUS MEDIA. - ISSN 0169-3913. - 141:2(2022), pp. 469-498. [10.1007/s11242-021-01730-y]

Optimizing Water Consumption in Richards' Equation Framework with Step-Wise Root Water Uptake: A Simplified Model

Giovanni Girardi;
2022-01-01

Abstract

This work arises from the need of exploring new features for modeling and optimizing water consumption in irrigation processes. In particular, we focus on water flow model in unsaturated soils, accounting also for a root water uptake term, which is assumed to be discontinuos in the state variable. We investigate the possibility of accomplishing such optimization by computing the steady solutions of a theta-based Richards equation revised as equilibrium points of the ODEs system resulting from a numerical semi-dicretization in the space; after such semi-discretization, these equilibrium points are computed exactly as the solutions of a linear system of algebraic equations: the case in which the equilibrium lies on the threshold for the uptake term is of particular interest, since the system considerably simplifies. In this framework, the problem of minimizing the water waste below the root level is investigated. Numerical simulations are provided for representing the obtained results.Article HighlightsRoot water uptake is modelled in a Richards' equation framework with a discontinuoussink term.After a proper semidiscretization in space, equilibrium points of the resultingnonlinear ODE system are computed exactly.The proposed approach simplifies a control problem for optimizing water consumption.
2022
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11566/314949
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