Introduzimos um novo método de Galerkin descontínuo para problemas elípticos de segunda ordem com penalização simultânea nos saltos da solução e nos saltos dos fluxos da solução numérica. Efetuamos uma análise a priori do erro e demonstramos hp estimativas de convergência do método que são ótimas em h e quase-ótimas em p. As taxas de convergência demonstradas foram comprovados com uma série de experiências numéricas para uma solução suave do problema. Também estudamos a convergência no caso de uma solução irregular.

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