Share:


VAGO Method for the solution of elliptic second‐order boundary value problems

Abstract

Mathematical physics problems are often formulated using differential operators of vector analysis, i.e. invariant operators of first order, namely, divergence, gradient and rotor (curl) operators. In approximation of such problems it is natural to employ similar operator formulations for grid problems. The VAGO (Vector Analysis Grid Operators) method is based on such a methodology. In this paper the vector analysis difference operators are constructed using the Delaunay triangulation and the Voronoi diagrams. Further the VAGO method is used to solve approximately boundary value problems for the general elliptic equation of second order. In the convection‐diffusion‐reaction equation the diffusion coefficient is a symmetric tensor of second order.


First published online: 10 Feb 2011

Keyword : finite difference method, unstructured grids, Delaunay triangulation, Voronoi diagrams, convection‐diffusion problems

How to Cite
Vabishchevich, N., & Vabishchevich, P. (2010). VAGO Method for the solution of elliptic second‐order boundary value problems. Mathematical Modelling and Analysis, 15(4), 533-545. https://doi.org/10.3846/1392-6292.2010.15.533-545
Published in Issue
Nov 15, 2010
Abstract Views
437
PDF Downloads
334
Creative Commons License

This work is licensed under a Creative Commons Attribution 4.0 International License.