Mar 17, 2012 · We propose an asymptotic preserving nodal discretization of the hyperbolic heat equation, also known as the P 1 equation, on unstructured ...

We propose an asymptotic preserving nodal discretization of the hyperbolic heat equation, also known as the P 1 equation, on unstructured meshes in 2-D.

This article extends finite volume numerical schemes, originally defined on polygonal meshes, to conical meshes (using rational quadratic Bezier curves),

In this work we give some answers for unstructured meshes, when considering the most simplify model, that is the P1 model also refereed to as the hyperbolic ...

In this work we give some answers for unstructured meshes, when considering the most simplify model, that is the P1 model also refereed to as the hyperbolic ...

Design of asymptotic preserving schemes for the hyperbolic heat equation on unstructured meshes. Numerische Mathematik, Springer Verlag,. 2012, http://www ...

Design of asymptotic preserving schemes for the hyperbolic heat equation on unstructured meshes. Christophe Buet∗, Bruno Després†& Emmanuel Franck‡. October ...

Design of asymptotic preserving finite volume schemes for the hyperbolic heat equation on unstructured meshes. https://doi.org/10.1007/s00211-012-0457-9 ...

Proof of uniform convergence for a cell-centered AP discretization of the hyperbolic heat equation on general meshes. HTML articles powered by AMS MathViewer.

Apr 1, 2021 · It is therefore the purpose of this paper to design a class of high-order and asymptotic-preserving schemes on unstructured meshes for the ...