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Abstract:

A virtual element method is introduced for the mixed approximation of a simple model problem for the Laplace operator on a polyhedron. The method is fully analysed when the meshes are made up of triangular right prisms, pyramids and tetrahedra. The local discrete spaces coincide with the lowest order Raviart–Thomas spaces on tetrahedral and triangular right prismatic elements, and extend them to pyramidal elements. The discrete scheme is well posed and optimal interpolation error estimates are proved on meshes which allow for anisotropic elements. In particular, local interpolation error estimates for the discrete element space are optimal and anisotropic on anisotropic right prisms. Furthermore, a discretization of the model problem in the presence of edge and vertex singularities is analysed for the proposed method on a family of suitably designed graded meshes, and optimal estimates for the approximation error are obtained, extending in this way the results of Farhloul et al. (ESAIM Math Model Numer Anal 35:907–920, 2001) where cylindrical domains with edge singularities were considered. © 2019, Istituto di Informatica e Telematica (IIT).

Registro:

Documento: Artículo
Título:A mixed discretization of elliptic problems on polyhedra using anisotropic hybrid meshes
Autor:Jawtuschenko, A.B.; Lombardi, A.L.
Filiación:Departamento de Matemática, Facultad de Ciencias Exactas y Naturales, Universidad de Buenos Aires, Pabellón I, Ciudad Universitaria, Buenos Aires, 1428, Argentina
Departamento de Matemática, Facultad de Ciencias Exactas, Ingeniería y Agrimensura, Universidad Nacional de Rosario, Av. Pellegrini 250, Rosario, 2000, Argentina
Consejo Nacional de Investigaciones Científicas y Técnicas (CONICET), CCT Rosario, Argentina
Palabras clave:Anisotropic hybrid meshes; Edge and vertex singularities; Mixed finite element method; Raviart–Thomas spaces; Virtual element method
Año:2019
Volumen:56
Número:2
DOI: http://dx.doi.org/10.1007/s10092-019-0303-x
Título revista:Calcolo
Título revista abreviado:Calcolo
ISSN:00080624
Registro:http://digital.bl.fcen.uba.ar/collection/paper/document/paper_00080624_v56_n2_p_Jawtuschenko

Referencias:

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Citas:

---------- APA ----------
Jawtuschenko, A.B. & Lombardi, A.L. (2019) . A mixed discretization of elliptic problems on polyhedra using anisotropic hybrid meshes. Calcolo, 56(2).
http://dx.doi.org/10.1007/s10092-019-0303-x
---------- CHICAGO ----------
Jawtuschenko, A.B., Lombardi, A.L. "A mixed discretization of elliptic problems on polyhedra using anisotropic hybrid meshes" . Calcolo 56, no. 2 (2019).
http://dx.doi.org/10.1007/s10092-019-0303-x
---------- MLA ----------
Jawtuschenko, A.B., Lombardi, A.L. "A mixed discretization of elliptic problems on polyhedra using anisotropic hybrid meshes" . Calcolo, vol. 56, no. 2, 2019.
http://dx.doi.org/10.1007/s10092-019-0303-x
---------- VANCOUVER ----------
Jawtuschenko, A.B., Lombardi, A.L. A mixed discretization of elliptic problems on polyhedra using anisotropic hybrid meshes. Calcolo. 2019;56(2).
http://dx.doi.org/10.1007/s10092-019-0303-x