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On the stability of a family of finite element methods for hyperbolic problems |
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| Authors: | Gerard R. Richter. |
| Affiliation: | Department of Computer Science, Rutgers University, New Brunswick, New Jersey 08903 |
| Abstract: | We consider a family of tensor product finite element methods for hyperbolic equations in |
| Keywords: | Finite elements hyperbolic explicit |
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, 
, which are explicit and generate a continuous approximate solution. The base case 
(an extension of the box scheme to higher order) is due to Winther, who proved stability and optimal order convergence. By means of a simple counterexample, we show that, for linear approximation with 
, the corresponding methods are unstable.