Abstract :
It is well known that the solution of the Laplace equation in a non convex polygonal domain of R 2 has a singular behaviour near non convex corners. Consequently we investigate three refined Finite volume methods (cell-center, conforming Finite volume-element and non conforming Finite volume-element) to approximate the solution of such a problem and restore optimal orders of convergence as for smooth solutions. Numerical tests are presented and confirm the theoretical rates of convergence.
Date of publication: October 2003
paper presented by : Professor Raphaele Herbin
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