Über Eine Klasse von L -Spline-Funktionen
Identifieur interne : 000435 ( Istex/Corpus ); précédent : 000434; suivant : 000436Über Eine Klasse von L -Spline-Funktionen
Auteurs : U. TippenhauerSource :
- Acta Mathematica Academiae Scientiarum Hungarica [ 0001-5954 ] ; 1976-09-01.
Url:
DOI: 10.1007/BF01896783
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Th6se</title><publicationDate>1966</publicationDate></host></json:item><json:item><host><pages><last>190</last><first>164</first></pages><author><json:item><name>G Birkhoff</name></json:item><json:item><name>C De</name></json:item><json:item><name> Boor</name></json:item></author><title>Piecewise polynomial interpolation and approximation. Approximation of functions</title><publicationDate>1965</publicationDate></host></json:item><json:item><author><json:item><name>C Boor</name></json:item><json:item><name>R,E Lynch</name></json:item></author><host><volume>15</volume><pages><last>969</last><first>953</first></pages><author></author><title>J. Math. Mech</title><publicationDate>1966</publicationDate></host><title>On splines and their minimum properties</title><publicationDate>1966</publicationDate></json:item><json:item><author><json:item><name>F,J Delvos</name></json:item><json:item><name>W Schempp</name></json:item></author><host><volume>74</volume><pages><last>409</last><first>399</first></pages><author></author><title>Monatsh. Math</title><publicationDate>1970</publicationDate></host><title>On spline systems</title><publicationDate>1970</publicationDate></json:item><json:item><author><json:item><name>J,W Jerome</name></json:item><json:item><name>L,L Schumaker</name></json:item></author><host><volume>2</volume><pages><last>49</last><first>29</first></pages><author></author><title>J. Approximation Theory</title><publicationDate>1969</publicationDate></host><title>On Lg-splines</title><publicationDate>1969</publicationDate></json:item><json:item><author><json:item><name>A Sard</name></json:item></author><host><author></author><title>Math. Surveys No. 9. Amer. Math. Soc</title><publicationDate>1963</publicationDate></host><title>Linear approximation</title><publicationDate>1963</publicationDate></json:item><json:item><author><json:item><name>W Schempp</name></json:item></author><host><volume>114</volume><pages><last>348</last><first>340</first></pages><author></author><title>Math. Z</title><publicationDate>1970</publicationDate></host><title>On spaces of distributions related to Schoenberg's approximation theorem</title><publicationDate>1970</publicationDate></json:item><json:item><author><json:item><name>W Schempp</name></json:item><json:item><name>U Tippenhauer</name></json:item><json:item><name>Reprokerne Zu Spline-Grundr</name></json:item></author><host><volume>136</volume><pages><last>369</last><first>357</first></pages><author></author><title>Math. Z</title><publicationDate>1974</publicationDate></host><publicationDate>1974</publicationDate></json:item><json:item><author><json:item><name>I,J Sehoenbnrc</name></json:item></author><host><volume>26</volume><pages><last>163</last><first>155</first></pages><author></author><title>Indagationes Math</title><publicationDate>1964</publicationDate></host><title>On best approximations of linear operators</title><publicationDate>1964</publicationDate></json:item><json:item><author><json:item><name>L Schwartz</name></json:item></author><host><pages><last>18</last><first>1</first></pages><author></author><title>S~minaire Bourbaki, Expos6 No. 238</title><publicationDate>1961</publicationDate></host><title>Sous-espaces hilbertiens et anti-noyaux associ6s</title><publicationDate>1961</publicationDate></json:item><json:item><author><json:item><name>L Schwcartz</name></json:item></author><host><volume>13</volume><pages><last>256</last><first>115</first></pages><author></author><title>J. Analyse Math</title><publicationDate>1964</publicationDate></host><title>Sous-espaces hilbertiens d'espaces vectoriels topologiques et noyaux associ~s (noyaux reproduisants)</title><publicationDate>1964</publicationDate></json:item><json:item><author><json:item><name>L Schwartz</name></json:item></author><host><pages><last>163</last><first>153</first></pages><author></author><title>Deuxieme Colloq. l'Analyse Fonct</title><publicationDate>1964</publicationDate></host><title>Sous-espaces hilbertiens et noyaux associ6s; applications anx repr6sentations des groupes de Lie</title><publicationDate>1964</publicationDate></json:item><json:item><author><json:item><name>U Ti~pen~au~r</name></json:item><json:item><name> Mehrdimensionale Invariante Interpolationssysteme In Hilbertr~iumen</name></json:item></author><host><volume>52</volume><pages><last>224</last><first>222</first></pages><author></author><title>Z. Angew. Math. Mech</title><publicationDate>1972</publicationDate></host><publicationDate>1972</publicationDate></json:item><json:item><host><author><json:item><name>U Tii~penhauer</name></json:item></author><title>Reproduzierende Kerne in Spline-Grundriiumen. 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