Finite Element Approximation of a Nonlinear Steady-State Heat Conduction Problem
Keywords:
Boundary value elliptic problems, Comparison principle, Maximum principle, Finite element method, Discrete maximum principle, Nonobtuse partitions.Abstract
We examine a nonlinear partial differential equation of elliptic type with the homogeneous Dirichlet boundary conditions. We prove comparison and maximum principles. For associated finite element approximations we introduce a discrete analogue of the maximum principle for linear elements, which is based on nonobtuse tetrahedral partitions.
Published
2001-02-02
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Finite Element Approximation of a Nonlinear Steady-State Heat Conduction Problem. (2001). Journal of Computational Mathematics, 19(1), 27-34. https://www.global-sci.com/index.php/JCM/article/view/11404