kw.\*:("Rational interpolation")
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Vector valued rational interpolants. IGRAVES-MORRIS, P. R.Numerische Mathematik. 1983, Vol 42, Num 3, pp 331-348, issn 0029-599XArticle
C1 rational quadratic spline interpolation to convex dataRAMIREZ, V; LORENTE, J.Applied numerical mathematics. 1986, Vol 2, Num 1, pp 37-42, issn 0168-9274Article
A note on vector-valued rational interpolationXIAOLIN ZHU; GONGQIN ZHU.Journal of computational and applied mathematics. 2006, Vol 195, Num 1-2, pp 341-350, issn 0377-0427, 10 p.Conference Paper
Positive interpolation with rational quadratic splinesSCHMIDT, J. W; HESS, W.Computing (Wien. Print). 1987, Vol 38, Num 3, pp 261-267, issn 0010-485XArticle
The determination of derivative parameters for a monotonic rational quadratic interpolantDELBOURGO, R; GREGORY, J. A.IMA journal of numerical analysis. 1985, Vol 5, Num 4, pp 397-406, issn 0272-4979Article
Fonctions splines avec conditions de forme = Spline functions with shape conditionsMEDINA, Julio.1985, 284 pThesis
Bivariate composite vector valued rational interpolationJIEQING TAN; SHUO TANG.Mathematics of computation. 2000, Vol 69, Num 232, pp 1521-1532, issn 0025-5718Article
Instability and modification of Thiele interpolating continued fractionsCUYT, A. A. M; JACOBSEN, L; VERDONK, B. M et al.Applied numerical mathematics. 1988, Vol 4, Num 2-4, pp 253-262, issn 0168-9274Article
Quadratur und rationale Hermite Interpolation = Quadrature and rational Hermite interpolationSCHNEIDER, C.Zeitschrift für angewandte Mathematik und Mechanik. 1994, Vol 74, Num 6, pp T696-T697, issn 0044-2267Article
On rational interpolation to |x|BRUTMAN, L; PASSOW, E.Constructive approximation. 1997, Vol 13, Num 3, pp 381-391, issn 0176-4276Article
Convergence rates of derivatives of a family of barycentric rational interpolantsBERRUT, Jean-Paul; FLOATER, Michael S; KLEIN, Georges et al.Applied numerical mathematics. 2011, Vol 61, Num 9, pp 989-1000, issn 0168-9274, 12 p.Article
A Fitzpatrick algorithm for multivariate rational interpolationPENG XIA; SHUGONG ZHANG; NA LEI et al.Journal of computational and applied mathematics. 2011, Vol 235, Num 17, pp 5222-5231, issn 0377-0427, 10 p.Article
A circle-preserving C2 Hermite interpolatory subdivision scheme with tension controlROMANI, L.Computer aided geometric design. 2010, Vol 27, Num 1, pp 36-47, issn 0167-8396, 12 p.Article
A high order multivariate approximation scheme for scattered data setsQIQI WANG; MOIN, Parviz; IACCARINO, Gianluca et al.Journal of computational physics (Print). 2010, Vol 229, Num 18, pp 6343-6361, issn 0021-9991, 19 p.Article
Parameterisation of symmetrical peaks in capillary electrophoresis using [3/2]-type rational approximantsGRAVES-MORRIS, P. R; FELL, A. F; BENSALEM, M et al.Journal of computational and applied mathematics. 2006, Vol 189, Num 1-2, pp 220-227, issn 0377-0427, 8 p.Conference Paper
A convexity preserving scheme for conservative advection transportXIAO, Feng; PENG, Xindong.Journal of computational physics (Print). 2004, Vol 198, Num 2, pp 389-402, issn 0021-9991, 14 p.Article
EIN ALGORITHMUS ZUR RATIONALEN INTERPOLATION = UN ALGORITHME POUR L'INTERPOLATION RATIONNELLEWERNER H.1980; SER. INT. ANAL. NUMER.; ISSN 0373-3149; CHE; DA. 1980; VOL. 52; PP. 319-337; ABS. ENG; BIBL. 9 REF.Conference Paper
A RELIABLE METHOD FOR RATIONAL INTERPOLATIONWERNER H.1979; LECTURE NOTES MATH.; DEU; DA. 1979; NO 765; PP. 257-277; BIBL. 7 REF.Conference Paper
AN EXTENSION OF SAFF'S THEOREM ON THE CONVERGENCE OF INTERPOLATING RATIONAL FUNCTIONS.WARNER DD.1976; J. APPROXIM. THEORY; U.S.A.; DA. 1976; VOL. 18; NO 2; PP. 108-118; ABS. 9 REF.Article
RATIONAL INTERPOLATION USING INCOMPLETE BARYCENTRIC FORMSSALZER HE.1981; Z. ANGEW. MATH. MECH.; ISSN 0044-2267; DDR; DA. 1981; VOL. 61; NO 3; PP. 161-164; ABS. GER/RUS; BIBL. 3 REF.Article
INTERPOLATION RATIONNELLE CONTINUE PAR MORCEAUX AYANT UN CARACTERE DE "SPLINE"DUPUY M.1979; METHODES NUMERIQUES DANS LES SCIENCES DE L'INGENIEUR. CONGRES INTERNATIONAL. 1/1978/PARIS; FRA; PARIS: DUNOD; DA. 1979; PP. 33-42; BIBL. 5 REF.Conference Paper
Computational complexity of sparse rational interpolationGRIGORIEV, D; KARPINSKI, M; SINGER, M. F et al.SIAM journal on computing (Print). 1994, Vol 23, Num 1, pp 1-11, issn 0097-5397Article
Explicit nearly optimal linear rational approximation with preassigned polesSTENGER, F.Mathematics of computation. 1986, Vol 47, Num 175, pp 225-252, issn 0025-5718Article
Accurate C2 rational interpolants in tensionDELBOURGO, R.SIAM journal on numerical analysis. 1993, Vol 30, Num 2, pp 595-607, issn 0036-1429Article
Shape preserving F3 curve interpolationKONG, V. P; ONG, B. H.Computer aided geometric design. 2002, Vol 19, Num 4, pp 239-256, issn 0167-8396Article