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Complex Approximations, Orthogonal Polynomials and Applications Workshop
June 8, 2021 17:30–17:55, Sochi
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On the best uniform polynomial approximation to the checkmark function
P. Dragnev Purdue University
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Abstract:
In this talk we shall consider the best uniform polynomial approximation of the checkmark function $f(x)=|x-\alpha |$ as $\alpha$ varies in $(-1,1)$. For each fixed degree $n$, the minimax error $E_n (\alpha)$ is shown to be piecewise analytic in $\alpha$ and the best approximants stem from classical polynomials of Chebyshev, Zolotarev, Krein, etc. In addition, $E_n(\alpha)$ is shown to feature $n-1$ piecewise linear decreasing/increasing sections, called V-shapes. The points of the alternation set are proven to be monotone increasing in $\alpha$ and their dynamics are completely characterized. We also prove a conjecture of Shekhtman that for odd $n$, $E_n(\alpha)$ has a local maximum at $\alpha=0$.
This is a joint work with Alan Legg (PUFW) and Ramon Orive (ULL), arXiv:2102.09502.
Language: English
Website:
https://us02web.zoom.us/j/8618528524?pwd=MmxGeHRWZHZnS0NLQi9jTTFTTzFrQT09
* Zoom conference ID: 861 852 8524 , password: caopa |
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