English

Onesided, intertwining, positive and copositive polynomial approximation with interpolatory constraints

Classical Analysis and ODEs 2023-05-04 v1

Abstract

Given kNk\in N, a nonnegative function fCr[a,b]f\in C^r[a,b], r0r\ge 0, an arbitrary finite collection of points {αi}iJ[a,b]\big\{\alpha_i\big\}_{i\in J} \subset [a,b], and a corresponding collection of nonnegative integers {mi}iJ\big\{m_i\big\}_{i\in J} with 0mir0\le m_i \le r, iJi\in J, is it true that, for sufficiently large nNn\in N, there exists a polynomial PnP_n of degree nn such that (i) f(x)Pn(x)cρnr(x)ωk(f(r),ρn(x);[a,b])|f(x)-P_n(x)| \le c \rho_n^r(x) \omega_k(f^{(r)}, \rho_n(x); [a,b]), x[a,b]x\in [a,b], where ρn(x):=n11x2+n2\rho_n (x):= n^{-1} \sqrt{1-x^2} +n^{-2} and ωk\omega_k is the classical kk-th modulus of smoothness, (ii) P(ν)(αi)=f(ν)(αi)P^{(\nu)}(\alpha_i)=f^{(\nu)}(\alpha_i), for all 0νmi0\le \nu \le m_i and all iJi\in J, and (iii) either PfP \ge f on [a,b][a,b] (\emph{onesided} approximation), or P0P \ge 0 on [a,b][a,b] (\emph{positive} approximation)? We provide {\em precise answers} not only to this question, but also to similar questions for more general {\em intertwining} and {\em copositive} polynomial approximation. It turns out that many of these answers are quite unexpected. We also show that, in general, similar questions for qq-monotone approximation with q1q\ge 1 have negative answers, i.e., qq-monotone approximation with general interpolatory constraints is impossible if q1q\ge 1.

Keywords

Cite

@article{arxiv.2305.01745,
  title  = {Onesided, intertwining, positive and copositive polynomial approximation with interpolatory constraints},
  author = {German Dzyubenko and Kirill A. Kopotun},
  journal= {arXiv preprint arXiv:2305.01745},
  year   = {2023}
}
R2 v1 2026-06-28T10:23:55.605Z