We say that the approximation of a linear operator issuperconsistent when the exact and the discrete operatorscoincide on a functional space whose dimension is bigger thanthe number of degrees of freedom needed in the constructionof the discretization. By providing several examples we show how to build superconsitent schemes.
Superconsistent Discretizations / Funaro, Daniele. - In: JOURNAL OF SCIENTIFIC COMPUTING. - ISSN 0885-7474. - STAMPA. - 17:1-4(2002), pp. 67-79. [10.1023/A:1015136227726]
Superconsistent Discretizations
FUNARO, Daniele
2002
Abstract
We say that the approximation of a linear operator issuperconsistent when the exact and the discrete operatorscoincide on a functional space whose dimension is bigger thanthe number of degrees of freedom needed in the constructionof the discretization. By providing several examples we show how to build superconsitent schemes.Pubblicazioni consigliate
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