Local Discontinuous Galerkin Method with Reduced Stabilization for Diffusion Equations

Communications in Computational Physics
Vol. 5 No. 2-4 (2009), pp. 498-514
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Author(s)
,
1 Univ Sussex, Dept Math, Brighton BN1 9RF, E Sussex, England
2 Swiss Inst Technol, Inst Anal & Sci Comp, CH-1015 Lausanne, Switzerland
Received
October 2, 2007
Accepted
May 8, 2008
Abstract

We extend the results on minimal stabilization of Burmanand Stamm [J. Sci. Comp., 33 (2007), pp. 183-208] to the case of the local discontinuous Galerkin methods on mixed form. The penalization term on the faces is relaxed to act only on a part of the polynomial spectrum. Stability in the form of a discrete inf-sup condition is proved and optimal convergence follows. Some numerical examples using high order approximation spaces illustrate the theory. 

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