We study best approximation to a given function, in the least square sense on
a subset of the unit circle, by polynomials of given degree which are pointwise
bounded on the complementary subset. We show that the solution to this problem,
as the degree goes large, converges to the solution of a bounded extremal
problem for analytic functions which is instrumental in system identification.
We provide a numerical example on real data from a hyperfrequency filter

Baratchart, L

Leblond, Juliette

Seyfert, Fabien

English

arXiv

International audienceWe study best approximation to a given function, in the least square sense on a subset of the unit circle, by polynomials of given degree which are pointwise bounded on the complementary subset. We show that the solution to this problem, as the degree goes large, converges to the solution of a bounded extremal problem for analytic functions which is instrumental in system identification. We provide a numerical example on real data from a hyperfrequency filter

Baratchart, Laurent

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Constrained L2-approximation by polynomials on subsets of the circle

https://hal.archives-ouvertes.fr/hal-01671183/document

Constrained $L^2$ -approximation by polynomials on subsets of the circle

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Constrained L2L^2L2-approximation by polynomials on subsets of the circle

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INRIA a CCSD electronic archive server

Constrained $L^2$ -approximation by polynomials on subsets of the circle