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Am 28.06.2013 19:07, schrieb Bill:
My answer was this: <Assume you somehow got an approximate solution of a linear system and you want to improve it by a defect <correction. Then you assume of course that the data of the approximate solution are infinitely precise. Even if <no digit of the "approximate" solution is correct you can with Rump's method compute a highly accurate <enclosure. Also here you assume that the "approximate" solution is infinitely precise. It may be difficult to understand that an "approximate" solution of which possibly no digit is correct all of a sudden is assumed being infinitely precise. But that's the way it is. All this has nothing to do with measured data. Best regards Ulrich -- Karlsruher Institut für Technologie (KIT) Institut für Angewandte und Numerische Mathematik D-76128 Karlsruhe, Germany Prof. Ulrich Kulisch Telefon: +49 721 608-42680 Fax: +49 721 608-46679 E-Mail: ulrich.kulisch@xxxxxxx www.kit.edu www.math.kit.edu/ianm2/~kulisch/ KIT - Universität des Landes Baden-Württemberg und nationales Großforschungszentrum in der Helmholtz-Gesellschaft |