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• Padua_points abstract "In polynomial interpolation of two variables, the Padua points are the first known example (and up to now the only one) of a unisolvent point set (that is, the interpolating polynomial is unique) with minimal growth of their Lebesgue constant, proven to be O(log2 n).Their name is due to the University of Padua, where they were originally discovered.The points are defined in the domain . It is possible to use the points with four orientations, obtained with subsequent 90-degree rotations: this way we get four different families of Padua points.".
• Padua_points thumbnail Padua_points_fam_1_degree_5.png?width=300.
• Padua_points wikiPageExternalLink CAApadua.html.
• Padua_points wikiPageID "13264358".
• Padua_points wikiPageRevisionID "531035028".
• Padua_points hasPhotoCollection Padua_points.
• Padua_points subject Category:Interpolation.
• Padua_points comment "In polynomial interpolation of two variables, the Padua points are the first known example (and up to now the only one) of a unisolvent point set (that is, the interpolating polynomial is unique) with minimal growth of their Lebesgue constant, proven to be O(log2 n).Their name is due to the University of Padua, where they were originally discovered.The points are defined in the domain .".
• Padua_points label "Padua points".
• Padua_points sameAs m.03b_rz9.
• Padua_points sameAs Q7123977.
• Padua_points sameAs Q7123977.
• Padua_points wasDerivedFrom Padua_points?oldid=531035028.
• Padua_points depiction Padua_points_fam_1_degree_5.png.
• Padua_points isPrimaryTopicOf Padua_points.