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We show how the Kimura-Georgiou parametrization for interpolating a function and its derivatives at 0 is independent of the particular choice of basis of Szegö-polynomials of first and second kind, but only on the map between these two polynomial bases. This leads to a more general parametrization, which extends to different interpolation points and multivariable setup.

On interpolation and the Kimura-Georgiou parametrization

Gombani A;
2007

Abstract

We show how the Kimura-Georgiou parametrization for interpolating a function and its derivatives at 0 is independent of the particular choice of basis of Szegö-polynomials of first and second kind, but only on the map between these two polynomial bases. This leads to a more general parametrization, which extends to different interpolation points and multivariable setup.
2007
INGEGNERIA BIOMEDICA
Inglese
Alessandro Chiuso; Augusto Ferrante; Stefano Pinzoni
MODELING, ESTIMATION AND CONTROL FESTSCHRIFT IN HONOR OF GIORGIO PICCI ON THE OCCASION OF HIS SIXTY-FIFTH BIRTHDAY
MODELING, ESTIMATION AND CONTROL FESTSCHRIFT IN HONOR OF GIORGIO PICCI ON THE OCCASION OF HIS SIXTY-FIFTH BIRTHDAY
171
182
12
3540735690
Sì, ma tipo non specificato
4-5 ottobre 2007
Venice
2-s2.0-35548974280
WOS:000250428800014
2
none
Gombani, A; Michaletzky, Gy
273
info:eu-repo/semantics/conferenceObject
04 Contributo in convegno::04.01 Contributo in Atti di convegno
04.01 Contributo in Atti di convegno
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/20.500.14243/239871
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