The set of unattainable points for the Rational Hermite Interpolation Problem

Teresa Cortadellas Benítez; Carlos D'Andrea; Eulàlia Montoro

doi:10.1016/j.laa.2017.09.034

The set of unattainable points for the Rational Hermite Interpolation Problem

Teresa Cortadellas Benítez
, Carlos D'Andrea
, Eulàlia Montoro^*

^*Corresponding author for this work

Research output: Indexed journal article › Article › peer-review

4 Citations (Scopus)

Abstract

We describe geometrically and algebraically the set of unattainable points for the Rational Hermite Interpolation Problem (i.e. those points where the problem does not have a solution). We show that this set is a union of equidimensional complete intersection varieties of odd codimension, the number of them being equal to the minimum between the degrees of the numerator and denominator of the problem. Each of these equidimensional varieties can be further decomposed as a union of as many rational (irreducible) varieties as input data points. We exhibit algorithms and equations defining all these objects.

Original language	English
Pages (from-to)	116-142
Number of pages	27
Journal	Linear Algebra and Its Applications
Volume	538
DOIs	https://doi.org/10.1016/j.laa.2017.09.034
Publication status	Published - 1 Feb 2018
Externally published	Yes

Keywords

Complete intersections
Equidimensional varieties
Rational Hermite interpolation
Rational varieties
Structured matrices
Unattainable points

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10.1016/j.laa.2017.09.034Licence: Other

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abstract = "We describe geometrically and algebraically the set of unattainable points for the Rational Hermite Interpolation Problem (i.e. those points where the problem does not have a solution). We show that this set is a union of equidimensional complete intersection varieties of odd codimension, the number of them being equal to the minimum between the degrees of the numerator and denominator of the problem. Each of these equidimensional varieties can be further decomposed as a union of as many rational (irreducible) varieties as input data points. We exhibit algorithms and equations defining all these objects.",

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AU - Cortadellas Benítez, Teresa

AU - D'Andrea, Carlos

AU - Montoro, Eulàlia

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Y1 - 2018/2/1

N2 - We describe geometrically and algebraically the set of unattainable points for the Rational Hermite Interpolation Problem (i.e. those points where the problem does not have a solution). We show that this set is a union of equidimensional complete intersection varieties of odd codimension, the number of them being equal to the minimum between the degrees of the numerator and denominator of the problem. Each of these equidimensional varieties can be further decomposed as a union of as many rational (irreducible) varieties as input data points. We exhibit algorithms and equations defining all these objects.

AB - We describe geometrically and algebraically the set of unattainable points for the Rational Hermite Interpolation Problem (i.e. those points where the problem does not have a solution). We show that this set is a union of equidimensional complete intersection varieties of odd codimension, the number of them being equal to the minimum between the degrees of the numerator and denominator of the problem. Each of these equidimensional varieties can be further decomposed as a union of as many rational (irreducible) varieties as input data points. We exhibit algorithms and equations defining all these objects.

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KW - Equidimensional varieties

KW - Rational Hermite interpolation

KW - Rational varieties

KW - Structured matrices

KW - Unattainable points

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The set of unattainable points for the Rational Hermite Interpolation Problem

Abstract

Keywords

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