This paper presents a general framework for the construction of piecewise-polynomial local interpolants with given smoothness and approximation order, defined on non-uniform knot partitions. We design such splines through a suitable combination of polynomial interpolants with either polynomial or rational, compactly supported blending functions. In particular, when the blending functions are rational, our approach provides spline interpolants having low, and sometimes minimum degree. Thanks to its generality, the proposed framework also allows us to recover uniform local interpolating splines previously proposed in the literature, to generalize them to the non-uniform case, and to complete families of arbitrary support width. Furthermore it provides new local interpolating polynomial splines with prescribed smoothness and polynomial reproduction properties.

Beccari, C., Casciola, G., Romani, L. (2013). Construction and characterization of non-uniform local interpolating polynomial splines. JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS, 240, 5-19 [10.1016/j.cam.2012.06.025].

Construction and characterization of non-uniform local interpolating polynomial splines

ROMANI, LUCIA
2013

Abstract

This paper presents a general framework for the construction of piecewise-polynomial local interpolants with given smoothness and approximation order, defined on non-uniform knot partitions. We design such splines through a suitable combination of polynomial interpolants with either polynomial or rational, compactly supported blending functions. In particular, when the blending functions are rational, our approach provides spline interpolants having low, and sometimes minimum degree. Thanks to its generality, the proposed framework also allows us to recover uniform local interpolating splines previously proposed in the literature, to generalize them to the non-uniform case, and to complete families of arbitrary support width. Furthermore it provides new local interpolating polynomial splines with prescribed smoothness and polynomial reproduction properties.
Articolo in rivista - Articolo scientifico
Local interpolation; Polynomial splines; non-uniform knot-partition; Blending; Rational functions
English
2013
240
5
19
open
Beccari, C., Casciola, G., Romani, L. (2013). Construction and characterization of non-uniform local interpolating polynomial splines. JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS, 240, 5-19 [10.1016/j.cam.2012.06.025].
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/10281/44284
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