期刊
COMMUNICATIONS IN NONLINEAR SCIENCE AND NUMERICAL SIMULATION
卷 128, 期 -, 页码 -出版社
ELSEVIER
DOI: 10.1016/j.cnsns.2023.107583
关键词
Richards' equation; Root water uptake; Ecological memory; Fractional calculus
This paper presents a novel approach to mathematically frame the concept of ecological memory of plant water stress in the context of root water uptake. A non-local sink term is used to model water absorption by roots, taking into account the memory effect. An integral equation is defined to model this memory effect, with the main objective of providing conditions for the existence and uniqueness of its solution. Tailored numerical methods are implemented and numerical simulations are provided.
In this paper we present a novel way to mathematically frame the concept of ecological memory of plant water stress in the context of root water uptake in unsaturated flow equations. Inspired by recent eco-hydrological papers, we model the water absorption by roots with a non-local sink term, accounting also for a memory effect. In order to model such a memory effect, an integral equation is defined; the main purpose of this work is to provide sufficient conditions on the functions at play for ensuring existence and uniqueness of its solution. Finally, tailored numerical methods are implemented, and numerical simulations are also provided.
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