Abstract
This article is concerned with an extension of univariate Chebyshev polynomials of the first kind to the multivariate setting, where one chases best approximants to specific monomials by polynomials of lower degree relative to the uniform norm. Exploiting the Moment-SOS hierarchy, we devise a versatile semidefinite-programming-based procedure to compute such best approximants, as well as associated signatures. Applying this procedure in three variables leads to the values of best approximation errors for all monomials up to degree six on the euclidean ball, the simplex, and the cross-polytope. Furthermore, inspired by numerical experiments, we obtain explicit expressions for Chebyshev polynomials in two cases unresolved before, namely for the monomial
on the euclidean ball and for the monomial
on the simplex.
on the euclidean ball and for the monomial
on the simplex.
Original language | English |
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Article number | 106116 |
Journal | Journal of Approximation Theory |
Volume | 305 |
Publication status | Published - Jan 2025 |
Keywords
- Best approximation
- Chebyshev polynomials
- Sum of squares
- Method of moments
- Semidefinite programming