Chebyshev blossoming in Müntz spaces: Toward shaping with Young diagrams

Rachid Ait-Haddou; Yusuke Sakane; Taishin Nomura

doi:10.1016/j.cam.2013.01.009

Chebyshev blossoming in Müntz spaces: Toward shaping with Young diagrams

Rachid Ait-Haddou^*
, Yusuke Sakane
, Taishin Nomura

^*Corresponding author for this work

Research output: Contribution to journal › Article › peer-review

19 Scopus citations

Abstract

The notion of a blossom in extended Chebyshev spaces offers adequate generalizations and extra-utilities to the tools for free-form design schemes. Unfortunately, such advantages are often overshadowed by the complexity of the resulting algorithms. In this work, we show that for the case of Müntz spaces with integer exponents, the notion of a Chebyshev blossom leads to elegant algorithms whose complexities are embedded in the combinatorics of Schur functions. We express the blossom and the pseudo-affinity property in Müntz spaces in terms of Schur functions. We derive an explicit expression for the Chebyshev-Bernstein basis via an inductive argument on nested Müntz spaces. We also reveal a simple algorithm for dimension elevation. Free-form design schemes in Müntz spaces with Young diagrams as shape parameters are discussed.

Original language	English
Pages (from-to)	172-208
Number of pages	37
Journal	Journal of Computational and Applied Mathematics
Volume	247
Issue number	1
DOIs	https://doi.org/10.1016/j.cam.2013.01.009
State	Published - 2013
Externally published	Yes

Bibliographical note

Funding Information:
This work was partially supported by the MEXT Global COE project.

Keywords

Chebyshev blossoming
Chebyshev-Bernstein basis
Computer aided design
Extended Chebyshev systems
Schur functions
Young diagrams

ASJC Scopus subject areas

Computational Mathematics
Applied Mathematics

Access to Document

10.1016/j.cam.2013.01.009

Cite this

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abstract = "The notion of a blossom in extended Chebyshev spaces offers adequate generalizations and extra-utilities to the tools for free-form design schemes. Unfortunately, such advantages are often overshadowed by the complexity of the resulting algorithms. In this work, we show that for the case of M{\"u}ntz spaces with integer exponents, the notion of a Chebyshev blossom leads to elegant algorithms whose complexities are embedded in the combinatorics of Schur functions. We express the blossom and the pseudo-affinity property in M{\"u}ntz spaces in terms of Schur functions. We derive an explicit expression for the Chebyshev-Bernstein basis via an inductive argument on nested M{\"u}ntz spaces. We also reveal a simple algorithm for dimension elevation. Free-form design schemes in M{\"u}ntz spaces with Young diagrams as shape parameters are discussed.",

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AU - Nomura, Taishin

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Chebyshev blossoming in Müntz spaces: Toward shaping with Young diagrams

Abstract

Bibliographical note

Keywords

ASJC Scopus subject areas

Access to Document

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Cite this