In this paper, the multinode Shepard method is adopted for the first time to numerically solve a differential problem with a discontinuity in the boundary. Starting from previous studies on elliptic boundary value problems, here the Shepard method is employed to catch the singularity on the boundary. Enrichments of the functional space spanned by the multinode cardinal Shepard basis functions are proposed to overcome the difficulties encountered. The Motz's problem is considered as numerical benchmark to assess the method. Numerical results are presented to show the effectiveness of the proposed approach.

Dell'Accio F., Di Tommaso F., Francomano E. (2024). The enriched multinode Shepard collocation method for solving elliptic problems with singularities. APPLIED NUMERICAL MATHEMATICS, 205, 87-100 [10.1016/j.apnum.2024.07.005].

The enriched multinode Shepard collocation method for solving elliptic problems with singularities

Francomano E.
2024-11-01

Abstract

In this paper, the multinode Shepard method is adopted for the first time to numerically solve a differential problem with a discontinuity in the boundary. Starting from previous studies on elliptic boundary value problems, here the Shepard method is employed to catch the singularity on the boundary. Enrichments of the functional space spanned by the multinode cardinal Shepard basis functions are proposed to overcome the difficulties encountered. The Motz's problem is considered as numerical benchmark to assess the method. Numerical results are presented to show the effectiveness of the proposed approach.
nov-2024
Settore MAT/08 - Analisi Numerica
Dell'Accio F., Di Tommaso F., Francomano E. (2024). The enriched multinode Shepard collocation method for solving elliptic problems with singularities. APPLIED NUMERICAL MATHEMATICS, 205, 87-100 [10.1016/j.apnum.2024.07.005].
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/10447/649893
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