We discuss some features of a boundary value problem for a system of PDEs that describes the growth of a sandpile in a container under the action of a vertical source. In particular, we characterize the long-term behavior of the profiles, and we provide a sufficient condition on the vertical source that guarantees the convergence to the equilibrium in a finite time. We show by counterexamples that a stable configuration may not be reached in a finite time, in general, even if the source is time independent. Finally, we provide a complete characterization of the equilibrium profiles.
On the differential model of sandpiles growing in a silo / Crasta, Graziano; Malusa, Annalisa. - In: SOVREMENNAÂ MATEMATIKA. FUNDAMENTALʹNYE NAPRAVLENIÂ. - ISSN 2413-3639. - 71:4(2025), pp. 626-641. [10.22363/2413-3639-2025-71-4-626-641]
On the differential model of sandpiles growing in a silo
Crasta, Graziano;Malusa, Annalisa
2025
Abstract
We discuss some features of a boundary value problem for a system of PDEs that describes the growth of a sandpile in a container under the action of a vertical source. In particular, we characterize the long-term behavior of the profiles, and we provide a sufficient condition on the vertical source that guarantees the convergence to the equilibrium in a finite time. We show by counterexamples that a stable configuration may not be reached in a finite time, in general, even if the source is time independent. Finally, we provide a complete characterization of the equilibrium profiles.| File | Dimensione | Formato | |
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