Two-sided a posteriori error bounds for incompressible quasi-Newtonian flows

We develop a posteriori upper and lower error bounds for mixed finite element approximations of a general family of steady, viscous, incompressible quasi-Newtonian flows in a bounded Lipschitz domain $\Omega \subset \mathbb{R}^d$; the family includes degenerate models such as the power-law model, a...

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主要な著者:	Berrone, S, Suli, E
フォーマット:	Report
出版事項:	Unspecified 2006

Two-sided a posteriori error bounds for incompressible quasi-Newtonian flows

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