Finite volume schemes for diffusion equations: Introduction to and review of modern methods

被引：216

作者：

Droniou, Jerome ^{[1
]}

机构：

[1] Monash Univ, Sch Math Sci, Clayton, Vic 3800, Australia

来源：

MATHEMATICAL MODELS & METHODS IN APPLIED SCIENCES | 2014年 / 24卷 / 08期

关键词：

Review; elliptic equation; finite volume schemes; multi-point flux approximation; hybrid mimetic mixed methods; discrete duality finite volume schemes; coercivity; convergence analysis; monotony; minimum and maximum principles; MULTIPOINT FLUX APPROXIMATION; DIFFERENCE METHOD; ANISOTROPIC DIFFUSION; CONVERGENCE ANALYSIS; QUADRILATERAL GRIDS; UNSTRUCTURED GRIDS; O-METHOD; MONOTONICITY CONDITIONS; POLYHEDRAL MESHES; MAXIMUM PRINCIPLE;

D O I：

10.1142/S0218202514400041

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

We present Finite Volume methods for diffusion equations on generic meshes, that received important coverage in the last decade or so. After introducing the main ideas and construction principles of the methods, we review some literature results, focusing on two important properties of schemes (discrete versions of well-known properties of the continuous equation): coercivity and minimum-maximum principles. Coercivity ensures the stability of the method as well as its convergence under assumptions compatible with real-world applications, whereas minimum-maximum principles are crucial in case of strong anisotropy to obtain physically meaningful approximate solutions.

引用

页码：1575 / 1619

页数：45

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